{smcl}
{com}{sf}{ul off}{txt}{.-}
      name:  {res}<unnamed>
       {txt}log:  {res}/Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Analysis/logSTATA/005_analysis_election.smcl
  {txt}log type:  {res}smcl
 {txt}opened on:  {res} 6 Nov 2021, 19:50:20
{txt}
{com}. 
. 
. *******************************************************************************
. /*                                        URPELAINEN & ZHANG 2021                                                */
. *******************************************************************************
. 
. /* 
> 
> File Name:      005_analysis_election.do
> 
> By:                             Alice Tianbo Zhang (alice.tianbo.zhang@gmail.com)
> 
> Last Edited:    11/3/2021
> 
> Purpose:                
> 
> Data Used:      election_district_panel.dta
>                                 ACS_panel_balanceTest_recodeVar.dta
> 
> Program Used:   - reghdfe -
>                                 - plausexog - 
> 
> */
. 
. 
. *******************************************************************************
. /*                                              TABLE 3                                                              */
. *******************************************************************************
. 
. ** Load election district panel
. cd "$rootDir/$dataDir/Final"
{res}/Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Data/Final
{txt}
{com}. use election_district_panel.dta, clear
{txt}
{com}. 
. ** Create instrument and fixed effects
. gen t = year - 2004
{txt}
{com}. gen inter = t * mean_wp
{txt}
{com}. 
. egen stateyear_fixed = group(state year)
{txt}
{com}. egen district_fixed = group(state district)
{txt}
{com}. 
. gen cum_lncapacity_turbine = log(cum_capacity_turbine + 1)
{txt}
{com}. gen cum_lncount_turbine = log(cum_count_turbine +1 )
{txt}
{com}. 
. gen turnout = votes1 + votes2 + votes3 + votes4
{txt}
{com}. gen lnturnout = log(turnout)
{txt}(1 missing value generated)

{com}. 
. reghdfe incumbvotes (cum_capacity_turbine=inter), absorb(stateyear_fixed district_fixed) stages(first) vce(cluster district_fixed) old
{err}(running historical version of reghdfe)
{res}{txt}(dropped 8 singleton observations)
{res}{txt}(converged in 8 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_capacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    284{txt}){col 67}= {res}     13.42
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0003
{txt}{col 51}R-squared{col 67}= {res}    0.7838
{txt}{col 51}Adj R-squared{col 67}= {res}    0.6598
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0991
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       285{txt}{col 51}Root MSE{col 67}= {res}   95.6516

{txt}{ralign 78:(Std. Err. adjusted for {res:285} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_capaci~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 30.39103{col 26}{space 2} 8.296887{col 37}{space 1}    3.66{col 46}{space 3}0.000{col 54}{space 4} 14.05983{col 67}{space 3} 46.72222
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           93              93              0     {c |} 
 district_fixed {c |}            0             285            285 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   285{txt}{col 55}Number of obs = {res}    1038
{txt}{col 55}F(  1,   284) = {res}    0.42
{txt}{col 55}Prob > F      = {res}  0.5189
{txt}Total (centered) SS     = {res} 53332.46938{txt}{col 55}Centered R2   = {res}  0.7340
{txt}Total (uncentered) SS   = {res} 53332.46938{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 53905.23774{txt}{col 55}Root MSE      = {res}   9.044

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}incumbvotesmajorpe~t{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2} .0077507{col 34}{space 2} .0120011{col 45}{space 1}    0.65{col 54}{space 3}0.519{col 62}{space 4}-.0158717{col 75}{space 3} .0313731
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.765
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0006
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 103.887
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  13.417
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           93              93              0     {c |} 
      district_fixed {c |}            0             285            285 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}
{com}. 
. 
. *-------------- Create function iv_2sls to save REGHDFE outputs -------------*
. local outcome demvotesmajorpercent repvotesmajorpercent incumbvotesmajorpercent turnout lnturnout // outcome variable 
{txt}
{com}. local endogenous cum_capacity_turbine cum_count_turbine cum_lncapacity_turbine cum_lncount_turbine // endogenous variable
{txt}
{com}. local instrument inter // instrument
{txt}
{com}. local admin1_trend stateyear_fixed // geography * time trend
{txt}
{com}. local admin2 district_fixed // panel unit (cluster variable)
{txt}
{com}. 
. 
. foreach y in `outcome' {c -(}
{txt}  2{com}.         // Create outcome variable label for storing estimates
.         local y_name = substr("`y'", 1, 3)
{txt}  3{com}.         
.         foreach x in `endogenous' {c -(}
{txt}  4{com}.                         // Create endogenous variable label for storing estimates
.                         tokenize "`x'", parse("_")
{txt}  5{com}.                         local x_name "`3'"
{txt}  6{com}.                         di "`x_name'"
{txt}  7{com}.                         
.                         // Run IV regression
.                         reghdfe `y' (`x' = `instrument'), absorb(`admin1_trend' `admin2') ffirst stages(first ols reduced) vce(cluster `admin2') old
{txt}  8{com}.                         
.                         // Store IV, first stage, OLS, reduced form estimates
.                         estimates store `y_name'_`x_name'_iv
{txt}  9{com}.                         estimates restore reghdfe_first1
{txt} 10{com}.                         estimates store `y_name'_`x_name'_first
{txt} 11{com}.                         estimates restore reghdfe_ols
{txt} 12{com}.                         estimates store `y_name'_`x_name'_ols
{txt} 13{com}.                         estimates restore reghdfe_reduced
{txt} 14{com}.                         estimates store `y_name'_`x_name'_reduced
{txt} 15{com}.                 {c )-}
{txt} 16{com}. {c )-}
capacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_capacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}     14.78
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0001
{txt}{col 51}R-squared{col 67}= {res}    0.7788
{txt}{col 51}Adj R-squared{col 67}= {res}    0.6659
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1069
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}   92.3979

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_capaci~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 30.68829{col 26}{space 2} 7.983272{col 37}{space 1}    3.84{col 46}{space 3}0.000{col 54}{space 4} 14.97487{col 67}{space 3} 46.40171
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      4.58
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0331
{txt}{col 51}R-squared{col 67}= {res}    0.8872
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8296
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0045
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    9.1403

{txt}{ralign 86:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}demvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2} .0063053{col 34}{space 2} .0029448{col 45}{space 1}    2.14{col 54}{space 3}0.033{col 62}{space 4} .0005091{col 75}{space 3} .0121016
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           99              99              0     {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      8.73
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0034
{txt}{col 51}R-squared{col 67}= {res}    0.8879
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8306
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0107
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    9.1119

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}demvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}  .909504{col 26}{space 2} .3077507{col 37}{space 1}    2.96{col 46}{space 3}0.003{col 54}{space 4} .3037603{col 67}{space 3} 1.515248
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   286{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   286{txt})
{res}cum_capacity{col 14}{txt}|{col 18}{res}   14.78{col 28}  0.0001{col 37}{txt}|{col 42}{res}   16.24{col 51}  0.0001{col 60}{txt}|{col 65}{res}   14.78

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}12.17  {col 61}{txt}P-val={res}0.0005

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  124.78
Kleibergen-Paap Wald rk F statistic{col 65}   14.78

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}286{txt})={col 49}{res}   8.73{col 61}{txt}P-val={res}0.0034
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   9.60{col 61}{txt}P-val={res}0.0019
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   8.03{col 61}{txt}P-val={res}0.0046

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       287
{txt}Number of observations               N  = {res}      1143
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    6.82
{txt}{col 55}Prob > F      = {res}  0.0095
{txt}Total (centered) SS     = {res} 63447.09059{txt}{col 55}Centered R2   = {res}  0.8801
{txt}Total (uncentered) SS   = {res} 63447.09059{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 67093.55543{txt}{col 55}Root MSE      = {res}   9.421

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}demvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2} .0296368{col 34}{space 2} .0113497{col 45}{space 1}    2.61{col 54}{space 3}0.009{col 62}{space 4} .0072972{col 75}{space 3} .0519764
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  12.168
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0005
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 124.781
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  14.777
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           99              99              0     {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
count
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_count_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}     14.07
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0002
{txt}{col 51}R-squared{col 67}= {res}    0.9878
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9816
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1119
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}   53.8576

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_count_~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 18.36091{col 26}{space 2} 4.895576{col 37}{space 1}    3.75{col 46}{space 3}0.000{col 54}{space 4} 8.724978{col 67}{space 3} 27.99683
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      5.44
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0204
{txt}{col 51}R-squared{col 67}= {res}    0.8872
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8297
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0051
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    9.1376

{txt}{ralign 83:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}demvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} .0114508{col 31}{space 2}  .004909{col 42}{space 1}    2.33{col 51}{space 3}0.020{col 59}{space 4} .0017884{col 72}{space 3} .0211132
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           99              99              0     {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      8.73
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0034
{txt}{col 51}R-squared{col 67}= {res}    0.8879
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8306
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0107
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    9.1119

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}demvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}  .909504{col 26}{space 2} .3077507{col 37}{space 1}    2.96{col 46}{space 3}0.003{col 54}{space 4} .3037603{col 67}{space 3} 1.515248
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   286{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   286{txt})
{res}cum_count_tu{col 14}{txt}|{col 18}{res}   14.07{col 28}  0.0002{col 37}{txt}|{col 42}{res}   15.46{col 51}  0.0001{col 60}{txt}|{col 65}{res}   14.07

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}11.64  {col 61}{txt}P-val={res}0.0006

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  131.47
Kleibergen-Paap Wald rk F statistic{col 65}   14.07

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}286{txt})={col 49}{res}   8.73{col 61}{txt}P-val={res}0.0034
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   9.60{col 61}{txt}P-val={res}0.0019
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   8.03{col 61}{txt}P-val={res}0.0046

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       287
{txt}Number of observations               N  = {res}      1143
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    6.48
{txt}{col 55}Prob > F      = {res}  0.0114
{txt}Total (centered) SS     = {res} 63447.09059{txt}{col 55}Centered R2   = {res}  0.8808
{txt}Total (uncentered) SS   = {res} 63447.09059{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 66704.76467{txt}{col 55}Root MSE      = {res}   9.393

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}demvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} .0495348{col 31}{space 2} .0194627{col 42}{space 1}    2.55{col 51}{space 3}0.011{col 59}{space 4} .0112265{col 72}{space 3} .0878432
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.639
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0006
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 131.469
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  14.066
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           99              99              0     {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncapacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncapacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}     22.50
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0000
{txt}{col 51}R-squared{col 67}= {res}    0.8766
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8135
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0347
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    0.7166

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncapa~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1304823{col 26}{space 2} .0275092{col 37}{space 1}    4.74{col 46}{space 3}0.000{col 54}{space 4} .0763362{col 67}{space 3} .1846284
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      0.20
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.6536
{txt}{col 51}R-squared{col 67}= {res}    0.8867
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8288
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0003
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    9.1596

{txt}{ralign 88:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}  demvotesmajorpercent{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2}-.2196498{col 36}{space 2} .4888822{col 47}{space 1}   -0.45{col 56}{space 3}0.654{col 64}{space 4}-1.181913{col 77}{space 3} .7426137
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}           99              99              0     {c |} 
        district_fixed {c |}            0             287            287 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      8.73
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0034
{txt}{col 51}R-squared{col 67}= {res}    0.8879
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8306
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0107
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    9.1119

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}demvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}  .909504{col 26}{space 2} .3077507{col 37}{space 1}    2.96{col 46}{space 3}0.003{col 54}{space 4} .3037603{col 67}{space 3} 1.515248
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   286{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   286{txt})
{res}cum_lncapaci{col 14}{txt}|{col 18}{res}   22.50{col 28}  0.0000{col 37}{txt}|{col 42}{res}   24.72{col 51}  0.0000{col 60}{txt}|{col 65}{res}   22.50

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}21.19  {col 61}{txt}P-val={res}0.0000

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   37.50
Kleibergen-Paap Wald rk F statistic{col 65}   22.50

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}286{txt})={col 49}{res}   8.73{col 61}{txt}P-val={res}0.0034
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   9.60{col 61}{txt}P-val={res}0.0019
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   8.03{col 61}{txt}P-val={res}0.0046

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       287
{txt}Number of observations               N  = {res}      1143
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    6.98
{txt}{col 55}Prob > F      = {res}  0.0087
{txt}Total (centered) SS     = {res} 63447.09059{txt}{col 55}Centered R2   = {res}  0.8495
{txt}Total (uncentered) SS   = {res} 63447.09059{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 84220.83942{txt}{col 55}Root MSE      = {res}   10.55

{txt}{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}  demvotesmajorpercent{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2} 6.970325{col 36}{space 2} 2.638123{col 47}{space 1}    2.64{col 56}{space 3}0.009{col 64}{space 4} 1.777724{col 77}{space 3} 12.16293
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  21.189
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0000
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  37.500
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  22.498
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncapacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}           99              99              0     {c |} 
        district_fixed {c |}            0             287            287 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncount
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncount_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}     23.04
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0000
{txt}{col 51}R-squared{col 67}= {res}    0.9146
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8710
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0380
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    0.6226

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncoun~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1188998{col 26}{space 2} .0247711{col 37}{space 1}    4.80{col 46}{space 3}0.000{col 54}{space 4}  .070143{col 67}{space 3} .1676565
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      0.08
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.7781
{txt}{col 51}R-squared{col 67}= {res}    0.8867
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8288
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0001
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    9.1605

{txt}{ralign 85:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}demvotesmajorperc~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2}-.1520435{col 33}{space 2} .5390821{col 44}{space 1}   -0.28{col 53}{space 3}0.778{col 61}{space 4}-1.213115{col 74}{space 3} .9090282
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}           99              99              0     {c |} 
     district_fixed {c |}            0             287            287 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      8.73
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0034
{txt}{col 51}R-squared{col 67}= {res}    0.8879
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8306
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0107
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    9.1119

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}demvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}  .909504{col 26}{space 2} .3077507{col 37}{space 1}    2.96{col 46}{space 3}0.003{col 54}{space 4} .3037603{col 67}{space 3} 1.515248
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   286{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   286{txt})
{res}cum_lncount_{col 14}{txt}|{col 18}{res}   23.04{col 28}  0.0000{col 37}{txt}|{col 42}{res}   25.31{col 51}  0.0000{col 60}{txt}|{col 65}{res}   23.04

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}21.84  {col 61}{txt}P-val={res}0.0000

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   41.25
Kleibergen-Paap Wald rk F statistic{col 65}   23.04

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}286{txt})={col 49}{res}   8.73{col 61}{txt}P-val={res}0.0034
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   9.60{col 61}{txt}P-val={res}0.0019
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   8.03{col 61}{txt}P-val={res}0.0046

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       287
{txt}Number of observations               N  = {res}      1143
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    6.80
{txt}{col 55}Prob > F      = {res}  0.0096
{txt}Total (centered) SS     = {res} 63447.09059{txt}{col 55}Centered R2   = {res}  0.8535
{txt}Total (uncentered) SS   = {res} 63447.09059{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 81981.34746{txt}{col 55}Root MSE      = {res}   10.41

{txt}{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}demvotesmajorperc~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2} 7.649333{col 33}{space 2} 2.933252{col 44}{space 1}    2.61{col 53}{space 3}0.010{col 61}{space 4} 1.875832{col 74}{space 3} 13.42283
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  21.839
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0000
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  41.254
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  23.039
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncount_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}           99              99              0     {c |} 
     district_fixed {c |}            0             287            287 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
capacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_capacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}     14.78
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0001
{txt}{col 51}R-squared{col 67}= {res}    0.7788
{txt}{col 51}Adj R-squared{col 67}= {res}    0.6659
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1069
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}   92.3979

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_capaci~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 30.68829{col 26}{space 2} 7.983272{col 37}{space 1}    3.84{col 46}{space 3}0.000{col 54}{space 4} 14.97487{col 67}{space 3} 46.40171
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      4.58
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0331
{txt}{col 51}R-squared{col 67}= {res}    0.8872
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8296
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0045
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    9.1403

{txt}{ralign 86:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}repvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}-.0063053{col 34}{space 2} .0029448{col 45}{space 1}   -2.14{col 54}{space 3}0.033{col 62}{space 4}-.0121016{col 75}{space 3}-.0005091
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           99              99              0     {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      8.73
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0034
{txt}{col 51}R-squared{col 67}= {res}    0.8879
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8306
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0107
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    9.1119

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}repvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} -.909504{col 26}{space 2} .3077507{col 37}{space 1}   -2.96{col 46}{space 3}0.003{col 54}{space 4}-1.515248{col 67}{space 3}-.3037603
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   286{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   286{txt})
{res}cum_capacity{col 14}{txt}|{col 18}{res}   14.78{col 28}  0.0001{col 37}{txt}|{col 42}{res}   16.24{col 51}  0.0001{col 60}{txt}|{col 65}{res}   14.78

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}12.17  {col 61}{txt}P-val={res}0.0005

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  124.78
Kleibergen-Paap Wald rk F statistic{col 65}   14.78

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}286{txt})={col 49}{res}   8.73{col 61}{txt}P-val={res}0.0034
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   9.60{col 61}{txt}P-val={res}0.0019
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   8.03{col 61}{txt}P-val={res}0.0046

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       287
{txt}Number of observations               N  = {res}      1143
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    6.82
{txt}{col 55}Prob > F      = {res}  0.0095
{txt}Total (centered) SS     = {res}  63447.0914{txt}{col 55}Centered R2   = {res}  0.8801
{txt}Total (uncentered) SS   = {res}  63447.0914{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 67093.55595{txt}{col 55}Root MSE      = {res}   9.421

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}repvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}-.0296368{col 34}{space 2} .0113497{col 45}{space 1}   -2.61{col 54}{space 3}0.009{col 62}{space 4}-.0519764{col 75}{space 3}-.0072972
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  12.168
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0005
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 124.781
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  14.777
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           99              99              0     {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
count
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_count_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}     14.07
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0002
{txt}{col 51}R-squared{col 67}= {res}    0.9878
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9816
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1119
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}   53.8576

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_count_~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 18.36091{col 26}{space 2} 4.895576{col 37}{space 1}    3.75{col 46}{space 3}0.000{col 54}{space 4} 8.724978{col 67}{space 3} 27.99683
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      5.44
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0204
{txt}{col 51}R-squared{col 67}= {res}    0.8872
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8297
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0051
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    9.1376

{txt}{ralign 83:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}repvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2}-.0114508{col 31}{space 2}  .004909{col 42}{space 1}   -2.33{col 51}{space 3}0.020{col 59}{space 4}-.0211132{col 72}{space 3}-.0017884
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           99              99              0     {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      8.73
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0034
{txt}{col 51}R-squared{col 67}= {res}    0.8879
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8306
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0107
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    9.1119

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}repvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} -.909504{col 26}{space 2} .3077507{col 37}{space 1}   -2.96{col 46}{space 3}0.003{col 54}{space 4}-1.515248{col 67}{space 3}-.3037603
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   286{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   286{txt})
{res}cum_count_tu{col 14}{txt}|{col 18}{res}   14.07{col 28}  0.0002{col 37}{txt}|{col 42}{res}   15.46{col 51}  0.0001{col 60}{txt}|{col 65}{res}   14.07

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}11.64  {col 61}{txt}P-val={res}0.0006

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  131.47
Kleibergen-Paap Wald rk F statistic{col 65}   14.07

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}286{txt})={col 49}{res}   8.73{col 61}{txt}P-val={res}0.0034
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   9.60{col 61}{txt}P-val={res}0.0019
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   8.03{col 61}{txt}P-val={res}0.0046

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       287
{txt}Number of observations               N  = {res}      1143
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    6.48
{txt}{col 55}Prob > F      = {res}  0.0114
{txt}Total (centered) SS     = {res}  63447.0914{txt}{col 55}Centered R2   = {res}  0.8808
{txt}Total (uncentered) SS   = {res}  63447.0914{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 66704.76519{txt}{col 55}Root MSE      = {res}   9.393

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}repvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2}-.0495348{col 31}{space 2} .0194627{col 42}{space 1}   -2.55{col 51}{space 3}0.011{col 59}{space 4}-.0878432{col 72}{space 3}-.0112265
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.639
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0006
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 131.469
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  14.066
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           99              99              0     {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncapacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncapacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}     22.50
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0000
{txt}{col 51}R-squared{col 67}= {res}    0.8766
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8135
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0347
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    0.7166

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncapa~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1304823{col 26}{space 2} .0275092{col 37}{space 1}    4.74{col 46}{space 3}0.000{col 54}{space 4} .0763362{col 67}{space 3} .1846284
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      0.20
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.6536
{txt}{col 51}R-squared{col 67}= {res}    0.8867
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8288
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0003
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    9.1596

{txt}{ralign 88:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}  repvotesmajorpercent{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2} .2196497{col 36}{space 2} .4888822{col 47}{space 1}    0.45{col 56}{space 3}0.654{col 64}{space 4}-.7426138{col 77}{space 3} 1.181913
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}           99              99              0     {c |} 
        district_fixed {c |}            0             287            287 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      8.73
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0034
{txt}{col 51}R-squared{col 67}= {res}    0.8879
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8306
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0107
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    9.1119

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}repvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} -.909504{col 26}{space 2} .3077507{col 37}{space 1}   -2.96{col 46}{space 3}0.003{col 54}{space 4}-1.515248{col 67}{space 3}-.3037603
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   286{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   286{txt})
{res}cum_lncapaci{col 14}{txt}|{col 18}{res}   22.50{col 28}  0.0000{col 37}{txt}|{col 42}{res}   24.72{col 51}  0.0000{col 60}{txt}|{col 65}{res}   22.50

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}21.19  {col 61}{txt}P-val={res}0.0000

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   37.50
Kleibergen-Paap Wald rk F statistic{col 65}   22.50

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}286{txt})={col 49}{res}   8.73{col 61}{txt}P-val={res}0.0034
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   9.60{col 61}{txt}P-val={res}0.0019
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   8.03{col 61}{txt}P-val={res}0.0046

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       287
{txt}Number of observations               N  = {res}      1143
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    6.98
{txt}{col 55}Prob > F      = {res}  0.0087
{txt}Total (centered) SS     = {res}  63447.0914{txt}{col 55}Centered R2   = {res}  0.8495
{txt}Total (uncentered) SS   = {res}  63447.0914{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res}  84220.8394{txt}{col 55}Root MSE      = {res}   10.55

{txt}{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}  repvotesmajorpercent{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2}-6.970325{col 36}{space 2} 2.638123{col 47}{space 1}   -2.64{col 56}{space 3}0.009{col 64}{space 4}-12.16292{col 77}{space 3}-1.777724
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  21.189
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0000
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  37.500
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  22.498
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncapacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}           99              99              0     {c |} 
        district_fixed {c |}            0             287            287 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncount
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncount_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}     23.04
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0000
{txt}{col 51}R-squared{col 67}= {res}    0.9146
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8710
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0380
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    0.6226

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncoun~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1188998{col 26}{space 2} .0247711{col 37}{space 1}    4.80{col 46}{space 3}0.000{col 54}{space 4}  .070143{col 67}{space 3} .1676565
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      0.08
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.7781
{txt}{col 51}R-squared{col 67}= {res}    0.8867
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8288
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0001
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    9.1605

{txt}{ralign 85:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}repvotesmajorperc~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2} .1520435{col 33}{space 2} .5390821{col 44}{space 1}    0.28{col 53}{space 3}0.778{col 61}{space 4}-.9090283{col 74}{space 3} 1.213115
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}           99              99              0     {c |} 
     district_fixed {c |}            0             287            287 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      8.73
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0034
{txt}{col 51}R-squared{col 67}= {res}    0.8879
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8306
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0107
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    9.1119

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}repvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} -.909504{col 26}{space 2} .3077507{col 37}{space 1}   -2.96{col 46}{space 3}0.003{col 54}{space 4}-1.515248{col 67}{space 3}-.3037603
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   286{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   286{txt})
{res}cum_lncount_{col 14}{txt}|{col 18}{res}   23.04{col 28}  0.0000{col 37}{txt}|{col 42}{res}   25.31{col 51}  0.0000{col 60}{txt}|{col 65}{res}   23.04

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}21.84  {col 61}{txt}P-val={res}0.0000

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   41.25
Kleibergen-Paap Wald rk F statistic{col 65}   23.04

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}286{txt})={col 49}{res}   8.73{col 61}{txt}P-val={res}0.0034
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   9.60{col 61}{txt}P-val={res}0.0019
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   8.03{col 61}{txt}P-val={res}0.0046

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       287
{txt}Number of observations               N  = {res}      1143
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    6.80
{txt}{col 55}Prob > F      = {res}  0.0096
{txt}Total (centered) SS     = {res}  63447.0914{txt}{col 55}Centered R2   = {res}  0.8535
{txt}Total (uncentered) SS   = {res}  63447.0914{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 81981.34747{txt}{col 55}Root MSE      = {res}   10.41

{txt}{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}repvotesmajorperc~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2}-7.649333{col 33}{space 2} 2.933252{col 44}{space 1}   -2.61{col 53}{space 3}0.010{col 61}{space 4}-13.42283{col 74}{space 3}-1.875832
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  21.839
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0000
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  41.254
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  23.039
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncount_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}           99              99              0     {c |} 
     district_fixed {c |}            0             287            287 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
capacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 8 singleton observations)
{res}{txt}(converged in 8 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_capacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    284{txt}){col 67}= {res}     13.42
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0003
{txt}{col 51}R-squared{col 67}= {res}    0.7838
{txt}{col 51}Adj R-squared{col 67}= {res}    0.6598
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0991
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       285{txt}{col 51}Root MSE{col 67}= {res}   95.6516

{txt}{ralign 78:(Std. Err. adjusted for {res:285} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_capaci~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 30.39103{col 26}{space 2} 8.296887{col 37}{space 1}    3.66{col 46}{space 3}0.000{col 54}{space 4} 14.05983{col 67}{space 3} 46.72222
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           93              93              0     {c |} 
 district_fixed {c |}            0             285            285 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    284{txt}){col 67}= {res}      0.33
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.5633
{txt}{col 51}R-squared{col 67}= {res}    0.7369
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5860
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0003
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       285{txt}{col 51}Root MSE{col 67}= {res}    8.9945

{txt}{ralign 86:(Std. Err. adjusted for {res:285} clusters in district_fixed)}
{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}incumbvotesmajorpe~t{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}-.0016454{col 34}{space 2} .0028439{col 45}{space 1}   -0.58{col 54}{space 3}0.563{col 62}{space 4}-.0072431{col 75}{space 3} .0039524
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           93              93              0     {c |} 
      district_fixed {c |}            0             285            285 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    284{txt}){col 67}= {res}      0.46
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.4972
{txt}{col 51}R-squared{col 67}= {res}    0.7370
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5861
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0007
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       285{txt}{col 51}Root MSE{col 67}= {res}    8.9927

{txt}{ralign 78:(Std. Err. adjusted for {res:285} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}incumbvote~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .2355517{col 26}{space 2} .3465291{col 37}{space 1}    0.68{col 46}{space 3}0.497{col 54}{space 4}-.4465397{col 67}{space 3} .9176431
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           93              93              0     {c |} 
 district_fixed {c |}            0             285            285 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   284{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   284{txt})
{res}cum_capacity{col 14}{txt}|{col 18}{res}   13.42{col 28}  0.0003{col 37}{txt}|{col 42}{res}   14.79{col 51}  0.0001{col 60}{txt}|{col 65}{res}   13.42

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}11.77  {col 61}{txt}P-val={res}0.0006

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  103.89
Kleibergen-Paap Wald rk F statistic{col 65}   13.42

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}284{txt})={col 49}{res}   0.46{col 61}{txt}P-val={res}0.4972
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.51{col 61}{txt}P-val={res}0.4754
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.51{col 61}{txt}P-val={res}0.4768

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       285
{txt}Number of observations               N  = {res}      1038
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   285{txt}{col 55}Number of obs = {res}    1038
{txt}{col 55}F(  1,   284) = {res}    0.42
{txt}{col 55}Prob > F      = {res}  0.5189
{txt}Total (centered) SS     = {res} 53332.46938{txt}{col 55}Centered R2   = {res}  0.7340
{txt}Total (uncentered) SS   = {res} 53332.46938{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 53905.23774{txt}{col 55}Root MSE      = {res}   9.044

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}incumbvotesmajorpe~t{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2} .0077507{col 34}{space 2} .0120011{col 45}{space 1}    0.65{col 54}{space 3}0.519{col 62}{space 4}-.0158717{col 75}{space 3} .0313731
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.765
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0006
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 103.887
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  13.417
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           93              93              0     {c |} 
      district_fixed {c |}            0             285            285 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
count
{err}(running historical version of reghdfe)
{res}{txt}(dropped 8 singleton observations)
{res}{txt}(converged in 8 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_count_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    284{txt}){col 67}= {res}     12.78
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0004
{txt}{col 51}R-squared{col 67}= {res}    0.9873
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9801
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1062
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       285{txt}{col 51}Root MSE{col 67}= {res}   55.8144

{txt}{ralign 78:(Std. Err. adjusted for {res:285} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_count_~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 18.42254{col 26}{space 2}  5.15322{col 37}{space 1}    3.57{col 46}{space 3}0.000{col 54}{space 4} 8.279185{col 67}{space 3} 28.56589
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           93              93              0     {c |} 
 district_fixed {c |}            0             285            285 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    284{txt}){col 67}= {res}      0.59
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.4437
{txt}{col 51}R-squared{col 67}= {res}    0.7369
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5861
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0006
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       285{txt}{col 51}Root MSE{col 67}= {res}    8.9936

{txt}{ralign 83:(Std. Err. adjusted for {res:285} clusters in district_fixed)}
{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}incumbvotesmajo~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} -.003581{col 31}{space 2} .0046682{col 42}{space 1}   -0.77{col 51}{space 3}0.444{col 59}{space 4}-.0127696{col 72}{space 3} .0056076
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           93              93              0     {c |} 
   district_fixed {c |}            0             285            285 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    284{txt}){col 67}= {res}      0.46
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.4972
{txt}{col 51}R-squared{col 67}= {res}    0.7370
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5861
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0007
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       285{txt}{col 51}Root MSE{col 67}= {res}    8.9927

{txt}{ralign 78:(Std. Err. adjusted for {res:285} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}incumbvote~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .2355517{col 26}{space 2} .3465291{col 37}{space 1}    0.68{col 46}{space 3}0.497{col 54}{space 4}-.4465397{col 67}{space 3} .9176431
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           93              93              0     {c |} 
 district_fixed {c |}            0             285            285 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   284{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   284{txt})
{res}cum_count_tu{col 14}{txt}|{col 18}{res}   12.78{col 28}  0.0004{col 37}{txt}|{col 42}{res}   14.09{col 51}  0.0002{col 60}{txt}|{col 65}{res}   12.78

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}11.15  {col 61}{txt}P-val={res}0.0008

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  112.11
Kleibergen-Paap Wald rk F statistic{col 65}   12.78

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}284{txt})={col 49}{res}   0.46{col 61}{txt}P-val={res}0.4972
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.51{col 61}{txt}P-val={res}0.4754
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.51{col 61}{txt}P-val={res}0.4768

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       285
{txt}Number of observations               N  = {res}      1038
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   285{txt}{col 55}Number of obs = {res}    1038
{txt}{col 55}F(  1,   284) = {res}    0.42
{txt}{col 55}Prob > F      = {res}  0.5198
{txt}Total (centered) SS     = {res} 53332.46938{txt}{col 55}Centered R2   = {res}  0.7339
{txt}Total (uncentered) SS   = {res} 53332.46938{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 53918.27467{txt}{col 55}Root MSE      = {res}   9.045

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}incumbvotesmajo~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} .0127861{col 31}{space 2} .0198384{col 42}{space 1}    0.64{col 51}{space 3}0.520{col 59}{space 4}-.0262628{col 72}{space 3} .0518349
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.150
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0008
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 112.114
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  12.780
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           93              93              0     {c |} 
   district_fixed {c |}            0             285            285 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncapacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 8 singleton observations)
{res}{txt}(converged in 8 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncapacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    284{txt}){col 67}= {res}     17.23
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0000
{txt}{col 51}R-squared{col 67}= {res}    0.8852
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8194
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0309
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       285{txt}{col 51}Root MSE{col 67}= {res}    0.7008

{txt}{ralign 78:(Std. Err. adjusted for {res:285} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncapa~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1198741{col 26}{space 2} .0288764{col 37}{space 1}    4.15{col 46}{space 3}0.000{col 54}{space 4} .0630353{col 67}{space 3} .1767129
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           93              93              0     {c |} 
 district_fixed {c |}            0             285            285 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    284{txt}){col 67}= {res}      1.07
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.3029
{txt}{col 51}R-squared{col 67}= {res}    0.7372
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5865
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0015
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       285{txt}{col 51}Root MSE{col 67}= {res}    8.9893

{txt}{ralign 88:(Std. Err. adjusted for {res:285} clusters in district_fixed)}
{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}incumbvotesmajorperc~t{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2}-.4910827{col 36}{space 2} .4757647{col 47}{space 1}   -1.03{col 56}{space 3}0.303{col 64}{space 4}-1.427555{col 77}{space 3} .4453898
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}           93              93              0     {c |} 
        district_fixed {c |}            0             285            285 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    284{txt}){col 67}= {res}      0.46
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.4972
{txt}{col 51}R-squared{col 67}= {res}    0.7370
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5861
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0007
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       285{txt}{col 51}Root MSE{col 67}= {res}    8.9927

{txt}{ralign 78:(Std. Err. adjusted for {res:285} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}incumbvote~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .2355517{col 26}{space 2} .3465291{col 37}{space 1}    0.68{col 46}{space 3}0.497{col 54}{space 4}-.4465397{col 67}{space 3} .9176431
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           93              93              0     {c |} 
 district_fixed {c |}            0             285            285 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   284{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   284{txt})
{res}cum_lncapaci{col 14}{txt}|{col 18}{res}   17.23{col 28}  0.0000{col 37}{txt}|{col 42}{res}   19.00{col 51}  0.0000{col 60}{txt}|{col 65}{res}   17.23

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}18.45  {col 61}{txt}P-val={res}0.0000

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   30.11
Kleibergen-Paap Wald rk F statistic{col 65}   17.23

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}284{txt})={col 49}{res}   0.46{col 61}{txt}P-val={res}0.4972
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.51{col 61}{txt}P-val={res}0.4754
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.51{col 61}{txt}P-val={res}0.4768

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       285
{txt}Number of observations               N  = {res}      1038
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   285{txt}{col 55}Number of obs = {res}    1038
{txt}{col 55}F(  1,   284) = {res}    0.44
{txt}{col 55}Prob > F      = {res}  0.5091
{txt}Total (centered) SS     = {res} 53332.46938{txt}{col 55}Centered R2   = {res}  0.7273
{txt}Total (uncentered) SS   = {res} 53332.46938{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 55266.58519{txt}{col 55}Root MSE      = {res}   9.158

{txt}{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}incumbvotesmajorperc~t{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2} 1.964993{col 36}{space 2}   2.9726{col 47}{space 1}    0.66{col 56}{space 3}0.509{col 64}{space 4}-3.886131{col 77}{space 3} 7.816117
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  18.448
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0000
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  30.110
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  17.233
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncapacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}           93              93              0     {c |} 
        district_fixed {c |}            0             285            285 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncount
{err}(running historical version of reghdfe)
{res}{txt}(dropped 8 singleton observations)
{res}{txt}(converged in 8 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncount_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    284{txt}){col 67}= {res}     18.33
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0000
{txt}{col 51}R-squared{col 67}= {res}    0.9208
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8753
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0346
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       285{txt}{col 51}Root MSE{col 67}= {res}    0.6099

{txt}{ralign 78:(Std. Err. adjusted for {res:285} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncoun~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1106296{col 26}{space 2} .0258393{col 37}{space 1}    4.28{col 46}{space 3}0.000{col 54}{space 4} .0597688{col 67}{space 3} .1614904
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           93              93              0     {c |} 
 district_fixed {c |}            0             285            285 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    284{txt}){col 67}= {res}      0.38
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.5387
{txt}{col 51}R-squared{col 67}= {res}    0.7369
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5860
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0005
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       285{txt}{col 51}Root MSE{col 67}= {res}    8.9937

{txt}{ralign 85:(Std. Err. adjusted for {res:285} clusters in district_fixed)}
{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}incumbvotesmajorp~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2}-.3327064{col 33}{space 2} .5404812{col 44}{space 1}   -0.62{col 53}{space 3}0.539{col 61}{space 4}-1.396564{col 74}{space 3} .7311508
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}           93              93              0     {c |} 
     district_fixed {c |}            0             285            285 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    284{txt}){col 67}= {res}      0.46
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.4972
{txt}{col 51}R-squared{col 67}= {res}    0.7370
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5861
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0007
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       285{txt}{col 51}Root MSE{col 67}= {res}    8.9927

{txt}{ralign 78:(Std. Err. adjusted for {res:285} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}incumbvote~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .2355517{col 26}{space 2} .3465291{col 37}{space 1}    0.68{col 46}{space 3}0.497{col 54}{space 4}-.4465397{col 67}{space 3} .9176431
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           93              93              0     {c |} 
 district_fixed {c |}            0             285            285 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   284{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   284{txt})
{res}cum_lncount_{col 14}{txt}|{col 18}{res}   18.33{col 28}  0.0000{col 37}{txt}|{col 42}{res}   20.21{col 51}  0.0000{col 60}{txt}|{col 65}{res}   18.33

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}19.59  {col 61}{txt}P-val={res}0.0000

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   33.85
Kleibergen-Paap Wald rk F statistic{col 65}   18.33

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}284{txt})={col 49}{res}   0.46{col 61}{txt}P-val={res}0.4972
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.51{col 61}{txt}P-val={res}0.4754
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.51{col 61}{txt}P-val={res}0.4768

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       285
{txt}Number of observations               N  = {res}      1038
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   285{txt}{col 55}Number of obs = {res}    1038
{txt}{col 55}F(  1,   284) = {res}    0.45
{txt}{col 55}Prob > F      = {res}  0.5051
{txt}Total (centered) SS     = {res} 53332.46938{txt}{col 55}Centered R2   = {res}  0.7293
{txt}Total (uncentered) SS   = {res} 53332.46938{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 54843.59159{txt}{col 55}Root MSE      = {res}   9.123

{txt}{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}incumbvotesmajorp~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2} 2.129192{col 33}{space 2} 3.190326{col 44}{space 1}    0.67{col 53}{space 3}0.505{col 61}{space 4}-4.150493{col 74}{space 3} 8.408878
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  19.588
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0000
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  33.855
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  18.331
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncount_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}           93              93              0     {c |} 
     district_fixed {c |}            0             285            285 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
capacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_capacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}     14.78
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0001
{txt}{col 51}R-squared{col 67}= {res}    0.7788
{txt}{col 51}Adj R-squared{col 67}= {res}    0.6659
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1069
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}   92.3979

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_capaci~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 30.68829{col 26}{space 2} 7.983272{col 37}{space 1}    3.84{col 46}{space 3}0.000{col 54}{space 4} 14.97487{col 67}{space 3} 46.40171
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      0.01
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.9384
{txt}{col 51}R-squared{col 67}= {res}    0.9676
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9511
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0000
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}14855.2410

{txt}{ralign 86:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}             turnout{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}-.3375468{col 34}{space 2} 4.362595{col 45}{space 1}   -0.08{col 54}{space 3}0.938{col 62}{space 4}-8.924414{col 75}{space 3}  8.24932
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           99              99              0     {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      1.16
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.2823
{txt}{col 51}R-squared{col 67}= {res}    0.9677
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9512
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0015
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}14843.9375

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}     turnout{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}-557.2618{col 26}{space 2} 517.3504{col 37}{space 1}   -1.08{col 46}{space 3}0.282{col 54}{space 4}-1575.559{col 67}{space 3} 461.0356
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   286{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   286{txt})
{res}cum_capacity{col 14}{txt}|{col 18}{res}   14.78{col 28}  0.0001{col 37}{txt}|{col 42}{res}   16.24{col 51}  0.0001{col 60}{txt}|{col 65}{res}   14.78

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}12.17  {col 61}{txt}P-val={res}0.0005

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  124.78
Kleibergen-Paap Wald rk F statistic{col 65}   14.78

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}286{txt})={col 49}{res}   1.16{col 61}{txt}P-val={res}0.2823
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.27{col 61}{txt}P-val={res}0.2589
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.25{col 61}{txt}P-val={res}0.2643

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       287
{txt}Number of observations               N  = {res}      1143
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    0.92
{txt}{col 55}Prob > F      = {res}  0.3376
{txt}Total (centered) SS     = {res} 1.66834e+11{txt}{col 55}Centered R2   = {res}  0.9672
{txt}Total (uncentered) SS   = {res} 1.66834e+11{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 1.69128e+11{txt}{col 55}Root MSE      = {res}   14957

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}             turnout{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}-18.15877{col 34}{space 2} 18.90522{col 45}{space 1}   -0.96{col 54}{space 3}0.338{col 62}{space 4} -55.3698{col 75}{space 3} 19.05225
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  12.168
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0005
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 124.781
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  14.777
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           99              99              0     {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
count
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_count_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}     14.07
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0002
{txt}{col 51}R-squared{col 67}= {res}    0.9878
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9816
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1119
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}   53.8576

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_count_~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 18.36091{col 26}{space 2} 4.895576{col 37}{space 1}    3.75{col 46}{space 3}0.000{col 54}{space 4} 8.724978{col 67}{space 3} 27.99683
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      0.03
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.8581
{txt}{col 51}R-squared{col 67}= {res}    0.9676
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9511
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0000
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}14855.0933

{txt}{ralign 83:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}          turnout{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2}-1.294875{col 31}{space 2} 7.234792{col 42}{space 1}   -0.18{col 51}{space 3}0.858{col 59}{space 4}-15.53507{col 72}{space 3} 12.94532
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           99              99              0     {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      1.16
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.2823
{txt}{col 51}R-squared{col 67}= {res}    0.9677
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9512
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0015
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}14843.9375

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}     turnout{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}-557.2618{col 26}{space 2} 517.3504{col 37}{space 1}   -1.08{col 46}{space 3}0.282{col 54}{space 4}-1575.559{col 67}{space 3} 461.0356
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   286{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   286{txt})
{res}cum_count_tu{col 14}{txt}|{col 18}{res}   14.07{col 28}  0.0002{col 37}{txt}|{col 42}{res}   15.46{col 51}  0.0001{col 60}{txt}|{col 65}{res}   14.07

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}11.64  {col 61}{txt}P-val={res}0.0006

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  131.47
Kleibergen-Paap Wald rk F statistic{col 65}   14.07

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}286{txt})={col 49}{res}   1.16{col 61}{txt}P-val={res}0.2823
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.27{col 61}{txt}P-val={res}0.2589
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.25{col 61}{txt}P-val={res}0.2643

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       287
{txt}Number of observations               N  = {res}      1143
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    0.93
{txt}{col 55}Prob > F      = {res}  0.3359
{txt}Total (centered) SS     = {res} 1.66834e+11{txt}{col 55}Centered R2   = {res}  0.9672
{txt}Total (uncentered) SS   = {res} 1.66834e+11{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 1.68914e+11{txt}{col 55}Root MSE      = {res}   14948

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}          turnout{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2}-30.35045{col 31}{space 2} 31.48571{col 42}{space 1}   -0.96{col 51}{space 3}0.336{col 59}{space 4}-92.32357{col 72}{space 3} 31.62267
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.639
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0006
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 131.469
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  14.066
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           99              99              0     {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncapacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncapacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}     22.50
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0000
{txt}{col 51}R-squared{col 67}= {res}    0.8766
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8135
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0347
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    0.7166

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncapa~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1304823{col 26}{space 2} .0275092{col 37}{space 1}    4.74{col 46}{space 3}0.000{col 54}{space 4} .0763362{col 67}{space 3} .1846284
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      0.62
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.4316
{txt}{col 51}R-squared{col 67}= {res}    0.9677
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9512
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0007
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}14850.1406

{txt}{ralign 88:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}               turnout{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2}-535.5537{col 36}{space 2} 680.0151{col 47}{space 1}   -0.79{col 56}{space 3}0.432{col 64}{space 4}-1874.023{col 77}{space 3} 802.9155
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}           99              99              0     {c |} 
        district_fixed {c |}            0             287            287 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      1.16
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.2823
{txt}{col 51}R-squared{col 67}= {res}    0.9677
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9512
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0015
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}14843.9375

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}     turnout{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}-557.2618{col 26}{space 2} 517.3504{col 37}{space 1}   -1.08{col 46}{space 3}0.282{col 54}{space 4}-1575.559{col 67}{space 3} 461.0356
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   286{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   286{txt})
{res}cum_lncapaci{col 14}{txt}|{col 18}{res}   22.50{col 28}  0.0000{col 37}{txt}|{col 42}{res}   24.72{col 51}  0.0000{col 60}{txt}|{col 65}{res}   22.50

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}21.19  {col 61}{txt}P-val={res}0.0000

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   37.50
Kleibergen-Paap Wald rk F statistic{col 65}   22.50

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}286{txt})={col 49}{res}   1.16{col 61}{txt}P-val={res}0.2823
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.27{col 61}{txt}P-val={res}0.2589
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.25{col 61}{txt}P-val={res}0.2643

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       287
{txt}Number of observations               N  = {res}      1143
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    1.08
{txt}{col 55}Prob > F      = {res}  0.3000
{txt}Total (centered) SS     = {res} 1.66834e+11{txt}{col 55}Centered R2   = {res}  0.9666
{txt}Total (uncentered) SS   = {res} 1.66834e+11{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 1.72330e+11{txt}{col 55}Root MSE      = {res}   15098

{txt}{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}               turnout{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2}-4270.784{col 36}{space 2} 4113.013{col 47}{space 1}   -1.04{col 56}{space 3}0.300{col 64}{space 4} -12366.4{col 77}{space 3} 3824.832
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  21.189
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0000
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  37.500
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  22.498
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncapacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}           99              99              0     {c |} 
        district_fixed {c |}            0             287            287 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncount
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncount_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}     23.04
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0000
{txt}{col 51}R-squared{col 67}= {res}    0.9146
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8710
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0380
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    0.6226

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncoun~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1188998{col 26}{space 2} .0247711{col 37}{space 1}    4.80{col 46}{space 3}0.000{col 54}{space 4}  .070143{col 67}{space 3} .1676565
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      0.96
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.3283
{txt}{col 51}R-squared{col 67}= {res}    0.9677
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9512
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0011
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}14847.1567

{txt}{ralign 85:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}            turnout{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2}-773.6814{col 33}{space 2} 790.1164{col 44}{space 1}   -0.98{col 53}{space 3}0.328{col 61}{space 4}-2328.862{col 74}{space 3} 781.4994
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}           99              99              0     {c |} 
     district_fixed {c |}            0             287            287 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      1.16
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.2823
{txt}{col 51}R-squared{col 67}= {res}    0.9677
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9512
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0015
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}14843.9375

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}     turnout{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}-557.2618{col 26}{space 2} 517.3504{col 37}{space 1}   -1.08{col 46}{space 3}0.282{col 54}{space 4}-1575.559{col 67}{space 3} 461.0356
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   286{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   286{txt})
{res}cum_lncount_{col 14}{txt}|{col 18}{res}   23.04{col 28}  0.0000{col 37}{txt}|{col 42}{res}   25.31{col 51}  0.0000{col 60}{txt}|{col 65}{res}   23.04

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}21.84  {col 61}{txt}P-val={res}0.0000

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   41.25
Kleibergen-Paap Wald rk F statistic{col 65}   23.04

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}286{txt})={col 49}{res}   1.16{col 61}{txt}P-val={res}0.2823
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.27{col 61}{txt}P-val={res}0.2589
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.25{col 61}{txt}P-val={res}0.2643

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       287
{txt}Number of observations               N  = {res}      1143
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    1.09
{txt}{col 55}Prob > F      = {res}  0.2971
{txt}Total (centered) SS     = {res} 1.66834e+11{txt}{col 55}Centered R2   = {res}  0.9668
{txt}Total (uncentered) SS   = {res} 1.66834e+11{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 1.71316e+11{txt}{col 55}Root MSE      = {res}   15054

{txt}{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}            turnout{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2}-4686.819{col 33}{space 2} 4486.525{col 44}{space 1}   -1.04{col 53}{space 3}0.297{col 61}{space 4}-13517.62{col 74}{space 3} 4143.978
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  21.839
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0000
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  41.254
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  23.039
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncount_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}           99              99              0     {c |} 
     district_fixed {c |}            0             287            287 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
capacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 6 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_capacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,142
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}     14.71
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0002
{txt}{col 51}R-squared{col 67}= {res}    0.7785
{txt}{col 51}Adj R-squared{col 67}= {res}    0.6652
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1069
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}   92.4586

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_capaci~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 30.69388{col 26}{space 2} 8.002614{col 37}{space 1}    3.84{col 46}{space 3}0.000{col 54}{space 4} 14.94239{col 67}{space 3} 46.44537
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,142
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      0.02
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.8827
{txt}{col 51}R-squared{col 67}= {res}    0.9698
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9543
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0000
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    0.0697

{txt}{ralign 86:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}           lnturnout{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2} 1.61e-06{col 34}{space 2} .0000109{col 45}{space 1}    0.15{col 54}{space 3}0.883{col 62}{space 4}-.0000198{col 75}{space 3} .0000231
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           99              99              0     {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,142
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      0.00
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.9609
{txt}{col 51}R-squared{col 67}= {res}    0.9698
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9543
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0000
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    0.0697

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}   lnturnout{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}-.0000884{col 26}{space 2}    .0018{col 37}{space 1}   -0.05{col 46}{space 3}0.961{col 54}{space 4}-.0036313{col 67}{space 3} .0034544
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   286{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   286{txt})
{res}cum_capacity{col 14}{txt}|{col 18}{res}   14.71{col 28}  0.0002{col 37}{txt}|{col 42}{res}   16.16{col 51}  0.0001{col 60}{txt}|{col 65}{res}   14.71

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}12.07  {col 61}{txt}P-val={res}0.0005

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  124.66
Kleibergen-Paap Wald rk F statistic{col 65}   14.71

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}286{txt})={col 49}{res}   0.00{col 61}{txt}P-val={res}0.9609
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.00{col 61}{txt}P-val={res}0.9589
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.00{col 61}{txt}P-val={res}0.9590

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       287
{txt}Number of observations               N  = {res}      1142
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1142
{txt}{col 55}F(  1,   286) = {res}    0.00
{txt}{col 55}Prob > F      = {res}  0.9609
{txt}Total (centered) SS     = {res} 3.670279162{txt}{col 55}Centered R2   = {res}  0.9698
{txt}Total (uncentered) SS   = {res} 3.670279162{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 3.670406188{txt}{col 55}Root MSE      = {res}  .06972

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}           lnturnout{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}-2.88e-06{col 34}{space 2} .0000588{col 45}{space 1}   -0.05{col 54}{space 3}0.961{col 62}{space 4}-.0001185{col 75}{space 3} .0001128
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  12.075
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0005
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 124.663
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  14.711
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           99              99              0     {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
count
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 6 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_count_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,142
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}     13.97
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0002
{txt}{col 51}R-squared{col 67}= {res}    0.9878
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9815
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1118
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}   53.8914

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_count_~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 18.35275{col 26}{space 2} 4.910672{col 37}{space 1}    3.74{col 46}{space 3}0.000{col 54}{space 4} 8.687109{col 67}{space 3} 28.01839
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,142
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      0.06
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.8098
{txt}{col 51}R-squared{col 67}= {res}    0.9698
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9543
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0000
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    0.0697

{txt}{ralign 83:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}        lnturnout{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} 4.64e-06{col 31}{space 2} .0000193{col 42}{space 1}    0.24{col 51}{space 3}0.810{col 59}{space 4}-.0000333{col 72}{space 3} .0000426
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           99              99              0     {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,142
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      0.00
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.9609
{txt}{col 51}R-squared{col 67}= {res}    0.9698
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9543
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0000
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    0.0697

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}   lnturnout{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}-.0000884{col 26}{space 2}    .0018{col 37}{space 1}   -0.05{col 46}{space 3}0.961{col 54}{space 4}-.0036313{col 67}{space 3} .0034544
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   286{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   286{txt})
{res}cum_count_tu{col 14}{txt}|{col 18}{res}   13.97{col 28}  0.0002{col 37}{txt}|{col 42}{res}   15.35{col 51}  0.0001{col 60}{txt}|{col 65}{res}   13.97

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}11.52  {col 61}{txt}P-val={res}0.0007

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  131.19
Kleibergen-Paap Wald rk F statistic{col 65}   13.97

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}286{txt})={col 49}{res}   0.00{col 61}{txt}P-val={res}0.9609
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.00{col 61}{txt}P-val={res}0.9589
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.00{col 61}{txt}P-val={res}0.9590

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       287
{txt}Number of observations               N  = {res}      1142
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1142
{txt}{col 55}F(  1,   286) = {res}    0.00
{txt}{col 55}Prob > F      = {res}  0.9609
{txt}Total (centered) SS     = {res} 3.670279162{txt}{col 55}Centered R2   = {res}  0.9698
{txt}Total (uncentered) SS   = {res} 3.670279162{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res}  3.67044686{txt}{col 55}Root MSE      = {res}  .06972

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}        lnturnout{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2}-4.82e-06{col 31}{space 2} .0000983{col 42}{space 1}   -0.05{col 51}{space 3}0.961{col 59}{space 4}-.0001982{col 72}{space 3} .0001886
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.524
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0007
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 131.187
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  13.968
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           99              99              0     {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncapacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 6 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncapacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,142
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}     22.10
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0000
{txt}{col 51}R-squared{col 67}= {res}    0.8759
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8125
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0344
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    0.7163

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncapa~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1298455{col 26}{space 2} .0276223{col 37}{space 1}    4.70{col 46}{space 3}0.000{col 54}{space 4} .0754767{col 67}{space 3} .1842143
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,142
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      0.17
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.6803
{txt}{col 51}R-squared{col 67}= {res}    0.9698
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9543
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0001
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    0.0697

{txt}{ralign 88:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}             lnturnout{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2} .0010092{col 36}{space 2} .0024468{col 47}{space 1}    0.41{col 56}{space 3}0.680{col 64}{space 4}-.0038069{col 77}{space 3} .0058253
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}           99              99              0     {c |} 
        district_fixed {c |}            0             287            287 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,142
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      0.00
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.9609
{txt}{col 51}R-squared{col 67}= {res}    0.9698
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9543
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0000
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    0.0697

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}   lnturnout{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}-.0000884{col 26}{space 2}    .0018{col 37}{space 1}   -0.05{col 46}{space 3}0.961{col 54}{space 4}-.0036313{col 67}{space 3} .0034544
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   286{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   286{txt})
{res}cum_lncapaci{col 14}{txt}|{col 18}{res}   22.10{col 28}  0.0000{col 37}{txt}|{col 42}{res}   24.28{col 51}  0.0000{col 60}{txt}|{col 65}{res}   22.10

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}20.59  {col 61}{txt}P-val={res}0.0000

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   37.17
Kleibergen-Paap Wald rk F statistic{col 65}   22.10

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}286{txt})={col 49}{res}   0.00{col 61}{txt}P-val={res}0.9609
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.00{col 61}{txt}P-val={res}0.9589
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.00{col 61}{txt}P-val={res}0.9590

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       287
{txt}Number of observations               N  = {res}      1142
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1142
{txt}{col 55}F(  1,   286) = {res}    0.00
{txt}{col 55}Prob > F      = {res}  0.9609
{txt}Total (centered) SS     = {res} 3.670279162{txt}{col 55}Centered R2   = {res}  0.9698
{txt}Total (uncentered) SS   = {res} 3.670279162{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res}  3.67101656{txt}{col 55}Root MSE      = {res}  .06973

{txt}{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}             lnturnout{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2} -.000681{col 36}{space 2} .0138682{col 47}{space 1}   -0.05{col 56}{space 3}0.961{col 64}{space 4}-.0279776{col 77}{space 3} .0266157
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  20.591
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0000
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  37.173
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  22.097
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncapacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}           99              99              0     {c |} 
        district_fixed {c |}            0             287            287 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncount
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 6 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncount_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,142
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}     22.56
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0000
{txt}{col 51}R-squared{col 67}= {res}    0.9144
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8707
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0377
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    0.6219

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncoun~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1182228{col 26}{space 2} .0248896{col 37}{space 1}    4.75{col 46}{space 3}0.000{col 54}{space 4} .0692328{col 67}{space 3} .1672128
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,142
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      0.14
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.7050
{txt}{col 51}R-squared{col 67}= {res}    0.9698
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9543
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0001
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    0.0697

{txt}{ralign 85:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}          lnturnout{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2} .0009958{col 33}{space 2} .0026274{col 44}{space 1}    0.38{col 53}{space 3}0.705{col 61}{space 4}-.0041756{col 74}{space 3} .0061672
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}           99              99              0     {c |} 
     district_fixed {c |}            0             287            287 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,142
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    286{txt}){col 67}= {res}      0.00
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.9609
{txt}{col 51}R-squared{col 67}= {res}    0.9698
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9543
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0000
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       287{txt}{col 51}Root MSE{col 67}= {res}    0.0697

{txt}{ralign 78:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}   lnturnout{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}-.0000884{col 26}{space 2}    .0018{col 37}{space 1}   -0.05{col 46}{space 3}0.961{col 54}{space 4}-.0036313{col 67}{space 3} .0034544
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           99              99              0     {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   286{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   286{txt})
{res}cum_lncount_{col 14}{txt}|{col 18}{res}   22.56{col 28}  0.0000{col 37}{txt}|{col 42}{res}   24.79{col 51}  0.0000{col 60}{txt}|{col 65}{res}   22.56

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}21.12  {col 61}{txt}P-val={res}0.0000

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   40.88
Kleibergen-Paap Wald rk F statistic{col 65}   22.56

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}286{txt})={col 49}{res}   0.00{col 61}{txt}P-val={res}0.9609
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.00{col 61}{txt}P-val={res}0.9589
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.00{col 61}{txt}P-val={res}0.9590

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       287
{txt}Number of observations               N  = {res}      1142
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1142
{txt}{col 55}F(  1,   286) = {res}    0.00
{txt}{col 55}Prob > F      = {res}  0.9609
{txt}Total (centered) SS     = {res} 3.670279162{txt}{col 55}Centered R2   = {res}  0.9698
{txt}Total (uncentered) SS   = {res} 3.670279162{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 3.670900962{txt}{col 55}Root MSE      = {res}  .06973

{txt}{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}          lnturnout{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2}-.0007479{col 33}{space 2} .0152286{col 44}{space 1}   -0.05{col 53}{space 3}0.961{col 61}{space 4}-.0307222{col 74}{space 3} .0292264
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  21.122
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0000
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  40.876
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  22.561
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncount_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}           99              99              0     {c |} 
     district_fixed {c |}            0             287            287 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)

{com}. 
. 
. *-------------------- Export LaTeX tables - Main Results --------------------*
. cd "$rootDir/$resultDir/Tables"
{res}/Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Results/Tables
{txt}
{com}. 
. * OLS
. esttab dem_capacity_ols dem_count_ols  ///
>                 inc_capacity_ols inc_count_ols using Table3.tex, booktabs replace ///
>                 refcat(cum_capacity_turbine "\emph{c -(}Panel A: OLS{c )-}", nolabel) ///
>                 b(%9.3f) se noconstant noobs nonotes star(* 0.10 ** 0.05 *** 0.01) ///
>                 varlabels(cum_capacity_turbine "Cumulative capacity (MW)" cum_count_turbine "Cumulative count") varwidth(27) modelwidth(13) ///
>                 mtitles("Model" "Model" "Model" "Model") ///
>                 mgroups("Democratic Vote" "Incumbent Vote", pattern(1 0 1 0) prefix(\multicolumn{c -(}@span{c )-}{c -(}c{c )-}{c -(}) suffix({c )-}) span erepeat(\cmidrule(lr){c -(}@span{c )-})) ///
>                 width(\hsize)
{res}{txt}(output written to {browse  `"Table3.tex"'})

{com}.                 
. * IV
. esttab dem_capacity_iv dem_count_iv ///
>                 inc_capacity_iv inc_count_iv using Table3.tex, booktabs append ///
>                 nomtitles se noconstant nonotes legend nonumbers collabels(none) star(* 0.10 ** 0.05 *** 0.01) ///
>                 b(%9.3f) stats(N N_clust r2, labels("Observations" "Districts" "\(R^{c -(}2{c )-}\)") fmt(0 0 2)) ///
>                 varlabels(cum_capacity_turbine "Cumulative capacity (MW)" cum_count_turbine "Cumulative count") varwidth(27) modelwidth(13) ///
>                 refcat(cum_capacity_turbine "\emph{c -(}Panel B: IV{c )-}", nolabel) ///
>                 width(\hsize)
{res}{txt}(output written to {browse  `"Table3.tex"'})

{com}. 
. 
. 
. *******************************************************************************
. /*                                              TABLE 5                                                              */
. *******************************************************************************
. 
. * OLS
. esttab tur_capacity_ols tur_count_ols lnt_capacity_ols lnt_count_ols using Table5.tex, booktabs replace ///
>                 refcat(cum_capacity_turbine "\emph{c -(}Panel A: OLS{c )-}", nolabel) ///
>                 b(%9.3f) se noconstant noobs nonotes star(* 0.10 ** 0.05 *** 0.01) ///
>                 varlabels(cum_capacity_turbine "Cumulative capacity (MW)" cum_count_turbine "Cumulative count") varwidth(27) modelwidth(13) ///
>                 mtitles("Model" "Model" "Model" "Model") ///
>                 mgroups("Turnout" "log(Turnout)", pattern(1 0 1 0) prefix(\multicolumn{c -(}@span{c )-}{c -(}c{c )-}{c -(}) suffix({c )-}) span erepeat(\cmidrule(lr){c -(}@span{c )-})) ///
>                 width(\hsize)
{res}{txt}(output written to {browse  `"Table5.tex"'})

{com}.                 
. * IV
. esttab tur_capacity_iv tur_count_iv lnt_capacity_iv lnt_count_iv using Table5.tex, booktabs append ///
>                 nomtitles se noconstant nonotes legend nonumbers collabels(none) star(* 0.10 ** 0.05 *** 0.01) ///
>                 b(%9.3f) stats(N N_clust r2, labels("Observations" "Districts" "\(R^{c -(}2{c )-}\)") fmt(0 0 2)) ///
>                 varlabels(cum_capacity_turbine "Cumulative capacity (MW)" cum_count_turbine "Cumulative count") varwidth(27) modelwidth(13) ///
>                 refcat(cum_capacity_turbine "\emph{c -(}Panel B: IV{c )-}", nolabel) ///
>                 width(\hsize)
{res}{txt}(output written to {browse  `"Table5.tex"'})

{com}. 
. 
. *******************************************************************************
. /*                                                      TABLE 4                                                             */
. *******************************************************************************
. local outcome incumbvotesmajorpercent // outcome variable 
{txt}
{com}. local endogenous cum_capacity_turbine cum_count_turbine cum_lncapacity_turbine cum_lncount_turbine // endogenous variable
{txt}
{com}. local instrument inter // instrument
{txt}
{com}. local admin1_trend stateyear_fixed // geography * time trend
{txt}
{com}. local admin2 district_fixed // panel unit (cluster variable)
{txt}
{com}. local party Dem Rep // party
{txt}
{com}. 
. foreach z in `party' {c -(}
{txt}  2{com}.         capture drop incumbent_`z'
{txt}  3{com}.         gen incumbent_`z' = 0
{txt}  4{com}.         replace incumbent_`z' = 1 if incumbent_party == "`z'"
{txt}  5{com}.                                 
.         foreach y in `outcome' {c -(}
{txt}  6{com}.                 // Create outcome variable label for storing estimates
.                 local y_name = substr("`y'", 1, 3)
{txt}  7{com}.                 
.                 foreach x in `endogenous' {c -(}
{txt}  8{com}.                                 // Create endogenous variable label for storing estimates
.                                 tokenize "`x'", parse("_")
{txt}  9{com}.                                 local x_name "`3'"
{txt} 10{com}.                                 di "`x_name'"
{txt} 11{com}.                                 
.                                 // Run IV regression
.                                 reghdfe `y' (`x' = `instrument') if incumbent_`z' == 1, absorb(`admin1_trend' `admin2') ffirst stages(first ols reduced) vce(cluster `admin2') old
{txt} 12{com}.                                 
.                                 // Store IV, first stage, OLS, reduced form estimates
.                                 estimates store `y_name'_`x_name'_`z'_iv
{txt} 13{com}.                                 estimates restore reghdfe_first1
{txt} 14{com}.                                 estimates store `y_name'_`x_name'_`z'_first
{txt} 15{com}.                                 estimates restore reghdfe_ols
{txt} 16{com}.                                 estimates store `y_name'_`x_name'_`z'_ols
{txt} 17{com}.                                 estimates restore reghdfe_reduced
{txt} 18{com}.                                 estimates store `y_name'_`x_name'_`z'_reduced
{txt} 19{com}.                         {c )-}
{txt} 20{com}.         {c )-}
{txt} 21{com}. {c )-}
{txt}(616 real changes made)
capacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 40 singleton observations)
{res}{txt}(converged in 9 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_capacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       576
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    158{txt}){col 67}= {res}      4.74
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0309
{txt}{col 51}R-squared{col 67}= {res}    0.9367
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8930
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0533
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       159{txt}{col 51}Root MSE{col 67}= {res}   40.9265

{txt}{ralign 78:(Std. Err. adjusted for {res:159} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_capaci~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 8.785415{col 26}{space 2} 4.034848{col 37}{space 1}    2.18{col 46}{space 3}0.031{col 54}{space 4} .8162195{col 67}{space 3} 16.75461
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           76              76              0     {c |} 
 district_fixed {c |}            0             159            159 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       576
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    158{txt}){col 67}= {res}      3.39
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0675
{txt}{col 51}R-squared{col 67}= {res}    0.7930
{txt}{col 51}Adj R-squared{col 67}= {res}    0.6499
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0020
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       159{txt}{col 51}Root MSE{col 67}= {res}    8.4827

{txt}{ralign 86:(Std. Err. adjusted for {res:159} clusters in district_fixed)}
{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}incumbvotesmajorpe~t{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}-.0090247{col 34}{space 2} .0049016{col 45}{space 1}   -1.84{col 54}{space 3}0.067{col 62}{space 4}-.0187058{col 75}{space 3} .0006564
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           76              76              0     {c |} 
      district_fixed {c |}            0             159            159 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       576
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    158{txt}){col 67}= {res}      1.83
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.1779
{txt}{col 51}R-squared{col 67}= {res}    0.7935
{txt}{col 51}Adj R-squared{col 67}= {res}    0.6507
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0044
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       159{txt}{col 51}Root MSE{col 67}= {res}    8.4724

{txt}{ralign 78:(Std. Err. adjusted for {res:159} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}incumbvote~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}  .510468{col 26}{space 2} .3772339{col 37}{space 1}    1.35{col 46}{space 3}0.178{col 54}{space 4}-.2346037{col 67}{space 3}  1.25554
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           76              76              0     {c |} 
 district_fixed {c |}            0             159            159 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   158{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   158{txt})
{res}cum_capacity{col 14}{txt}|{col 18}{res}    4.74{col 28}  0.0309{col 37}{txt}|{col 42}{res}    5.50{col 51}  0.0190{col 60}{txt}|{col 65}{res}    4.74

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}5.42   {col 61}{txt}P-val={res}0.0199

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   28.07
Kleibergen-Paap Wald rk F statistic{col 65}    4.74

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}158{txt})={col 49}{res}   1.83{col 61}{txt}P-val={res}0.1779
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   2.12{col 61}{txt}P-val={res}0.1451
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.93{col 61}{txt}P-val={res}0.1650

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       159
{txt}Number of observations               N  = {res}       576
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   159{txt}{col 55}Number of obs = {res}     576
{txt}{col 55}F(  1,   158) = {res}    1.16
{txt}{col 55}Prob > F      = {res}  0.2829
{txt}Total (centered) SS     = {res} 24514.15599{txt}{col 55}Centered R2   = {res}  0.7700
{txt}Total (uncentered) SS   = {res} 24514.15599{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 27175.81411{txt}{col 55}Root MSE      = {res}    8.94

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}incumbvotesmajorpe~t{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}  .058104{col 34}{space 2} .0539278{col 45}{space 1}    1.08{col 54}{space 3}0.283{col 62}{space 4}-.0484083{col 75}{space 3} .1646164
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   5.425
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0199
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  28.070
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   4.741
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           76              76              0     {c |} 
      district_fixed {c |}            0             159            159 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
count
{err}(running historical version of reghdfe)
{res}{txt}(dropped 40 singleton observations)
{res}{txt}(converged in 9 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_count_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       576
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    158{txt}){col 67}= {res}      4.94
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0277
{txt}{col 51}R-squared{col 67}= {res}    0.9978
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9962
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0534
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       159{txt}{col 51}Root MSE{col 67}= {res}   23.9171

{txt}{ralign 78:(Std. Err. adjusted for {res:159} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_count_~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}  5.14348{col 26}{space 2} 2.314357{col 37}{space 1}    2.22{col 46}{space 3}0.028{col 54}{space 4} .5724113{col 67}{space 3} 9.714548
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           76              76              0     {c |} 
 district_fixed {c |}            0             159            159 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       576
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    158{txt}){col 67}= {res}      3.54
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0619
{txt}{col 51}R-squared{col 67}= {res}    0.7929
{txt}{col 51}Adj R-squared{col 67}= {res}    0.6498
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0018
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       159{txt}{col 51}Root MSE{col 67}= {res}    8.4834

{txt}{ralign 83:(Std. Err. adjusted for {res:159} clusters in district_fixed)}
{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}incumbvotesmajo~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2}-.0147583{col 31}{space 2} .0078486{col 42}{space 1}   -1.88{col 51}{space 3}0.062{col 59}{space 4}-.0302599{col 72}{space 3} .0007434
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           76              76              0     {c |} 
   district_fixed {c |}            0             159            159 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       576
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    158{txt}){col 67}= {res}      1.83
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.1779
{txt}{col 51}R-squared{col 67}= {res}    0.7935
{txt}{col 51}Adj R-squared{col 67}= {res}    0.6507
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0044
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       159{txt}{col 51}Root MSE{col 67}= {res}    8.4724

{txt}{ralign 78:(Std. Err. adjusted for {res:159} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}incumbvote~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}  .510468{col 26}{space 2} .3772339{col 37}{space 1}    1.35{col 46}{space 3}0.178{col 54}{space 4}-.2346037{col 67}{space 3}  1.25554
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           76              76              0     {c |} 
 district_fixed {c |}            0             159            159 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   158{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   158{txt})
{res}cum_count_tu{col 14}{txt}|{col 18}{res}    4.94{col 28}  0.0277{col 37}{txt}|{col 42}{res}    5.73{col 51}  0.0167{col 60}{txt}|{col 65}{res}    4.94

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}5.62   {col 61}{txt}P-val={res}0.0178

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   28.17
Kleibergen-Paap Wald rk F statistic{col 65}    4.94

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}158{txt})={col 49}{res}   1.83{col 61}{txt}P-val={res}0.1779
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   2.12{col 61}{txt}P-val={res}0.1451
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.93{col 61}{txt}P-val={res}0.1650

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       159
{txt}Number of observations               N  = {res}       576
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   159{txt}{col 55}Number of obs = {res}     576
{txt}{col 55}F(  1,   158) = {res}    1.17
{txt}{col 55}Prob > F      = {res}  0.2800
{txt}Total (centered) SS     = {res} 24514.15599{txt}{col 55}Centered R2   = {res}  0.7703
{txt}Total (uncentered) SS   = {res} 24514.15599{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 27139.87997{txt}{col 55}Root MSE      = {res}   8.934

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}incumbvotesmajo~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} .0992457{col 31}{space 2} .0915596{col 42}{space 1}    1.08{col 51}{space 3}0.280{col 59}{space 4}-.0815929{col 72}{space 3} .2800842
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   5.615
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0178
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  28.172
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   4.939
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           76              76              0     {c |} 
   district_fixed {c |}            0             159            159 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncapacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 40 singleton observations)
{res}{txt}(converged in 9 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncapacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       576
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    158{txt}){col 67}= {res}      3.96
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0484
{txt}{col 51}R-squared{col 67}= {res}    0.9202
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8651
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0231
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       159{txt}{col 51}Root MSE{col 67}= {res}    0.4347

{txt}{ralign 78:(Std. Err. adjusted for {res:159} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncapa~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .0605181{col 26}{space 2}  .030419{col 37}{space 1}    1.99{col 46}{space 3}0.048{col 54}{space 4} .0004379{col 67}{space 3} .1205983
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           76              76              0     {c |} 
 district_fixed {c |}            0             159            159 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       576
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    158{txt}){col 67}= {res}      5.69
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0182
{txt}{col 51}R-squared{col 67}= {res}    0.7956
{txt}{col 51}Adj R-squared{col 67}= {res}    0.6544
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0148
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       159{txt}{col 51}Root MSE{col 67}= {res}    8.4282

{txt}{ralign 88:(Std. Err. adjusted for {res:159} clusters in district_fixed)}
{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}incumbvotesmajorperc~t{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2}-2.347852{col 36}{space 2} .9842841{col 47}{space 1}   -2.39{col 56}{space 3}0.018{col 64}{space 4}-4.291904{col 77}{space 3}-.4038003
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}           76              76              0     {c |} 
        district_fixed {c |}            0             159            159 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       576
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    158{txt}){col 67}= {res}      1.83
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.1779
{txt}{col 51}R-squared{col 67}= {res}    0.7935
{txt}{col 51}Adj R-squared{col 67}= {res}    0.6507
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0044
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       159{txt}{col 51}Root MSE{col 67}= {res}    8.4724

{txt}{ralign 78:(Std. Err. adjusted for {res:159} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}incumbvote~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}  .510468{col 26}{space 2} .3772339{col 37}{space 1}    1.35{col 46}{space 3}0.178{col 54}{space 4}-.2346037{col 67}{space 3}  1.25554
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           76              76              0     {c |} 
 district_fixed {c |}            0             159            159 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   158{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   158{txt})
{res}cum_lncapaci{col 14}{txt}|{col 18}{res}    3.96{col 28}  0.0484{col 37}{txt}|{col 42}{res}    4.59{col 51}  0.0322{col 60}{txt}|{col 65}{res}    3.96

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}4.84   {col 61}{txt}P-val={res}0.0278

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   11.80
Kleibergen-Paap Wald rk F statistic{col 65}    3.96

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}158{txt})={col 49}{res}   1.83{col 61}{txt}P-val={res}0.1779
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   2.12{col 61}{txt}P-val={res}0.1451
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.93{col 61}{txt}P-val={res}0.1650

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       159
{txt}Number of observations               N  = {res}       576
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   159{txt}{col 55}Number of obs = {res}     576
{txt}{col 55}F(  1,   158) = {res}    1.19
{txt}{col 55}Prob > F      = {res}  0.2780
{txt}Total (centered) SS     = {res} 24514.15599{txt}{col 55}Centered R2   = {res}  0.7309
{txt}Total (uncentered) SS   = {res} 24514.15599{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 31799.74373{txt}{col 55}Root MSE      = {res}   9.671

{txt}{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}incumbvotesmajorperc~t{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2} 8.434964{col 36}{space 2} 7.748454{col 47}{space 1}    1.09{col 56}{space 3}0.278{col 64}{space 4}-6.868945{col 77}{space 3} 23.73887
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   4.843
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0278
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  11.804
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   3.958
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncapacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}           76              76              0     {c |} 
        district_fixed {c |}            0             159            159 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncount
{err}(running historical version of reghdfe)
{res}{txt}(dropped 40 singleton observations)
{res}{txt}(converged in 9 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncount_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       576
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    158{txt}){col 67}= {res}      4.58
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0339
{txt}{col 51}R-squared{col 67}= {res}    0.9508
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9168
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0296
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       159{txt}{col 51}Root MSE{col 67}= {res}    0.3709

{txt}{ralign 78:(Std. Err. adjusted for {res:159} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncoun~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .0585826{col 26}{space 2} .0273765{col 37}{space 1}    2.14{col 46}{space 3}0.034{col 54}{space 4} .0045115{col 67}{space 3} .1126537
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           76              76              0     {c |} 
 district_fixed {c |}            0             159            159 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       576
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    158{txt}){col 67}= {res}      3.44
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0656
{txt}{col 51}R-squared{col 67}= {res}    0.7945
{txt}{col 51}Adj R-squared{col 67}= {res}    0.6525
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0094
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       159{txt}{col 51}Root MSE{col 67}= {res}    8.4514

{txt}{ralign 85:(Std. Err. adjusted for {res:159} clusters in district_fixed)}
{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}incumbvotesmajorp~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2} -2.18222{col 33}{space 2} 1.177048{col 44}{space 1}   -1.85{col 53}{space 3}0.066{col 61}{space 4}-4.506998{col 74}{space 3} .1425576
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}           76              76              0     {c |} 
     district_fixed {c |}            0             159            159 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       576
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    158{txt}){col 67}= {res}      1.83
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.1779
{txt}{col 51}R-squared{col 67}= {res}    0.7935
{txt}{col 51}Adj R-squared{col 67}= {res}    0.6507
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0044
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       159{txt}{col 51}Root MSE{col 67}= {res}    8.4724

{txt}{ralign 78:(Std. Err. adjusted for {res:159} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}incumbvote~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}  .510468{col 26}{space 2} .3772339{col 37}{space 1}    1.35{col 46}{space 3}0.178{col 54}{space 4}-.2346037{col 67}{space 3}  1.25554
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           76              76              0     {c |} 
 district_fixed {c |}            0             159            159 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   158{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   158{txt})
{res}cum_lncount_{col 14}{txt}|{col 18}{res}    4.58{col 28}  0.0339{col 37}{txt}|{col 42}{res}    5.31{col 51}  0.0212{col 60}{txt}|{col 65}{res}    4.58

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}5.65   {col 61}{txt}P-val={res}0.0175

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   15.20
Kleibergen-Paap Wald rk F statistic{col 65}    4.58

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}158{txt})={col 49}{res}   1.83{col 61}{txt}P-val={res}0.1779
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   2.12{col 61}{txt}P-val={res}0.1451
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.93{col 61}{txt}P-val={res}0.1650

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       159
{txt}Number of observations               N  = {res}       576
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   159{txt}{col 55}Number of obs = {res}     576
{txt}{col 55}F(  1,   158) = {res}    1.31
{txt}{col 55}Prob > F      = {res}  0.2544
{txt}Total (centered) SS     = {res} 24514.15599{txt}{col 55}Centered R2   = {res}  0.7461
{txt}Total (uncentered) SS   = {res} 24514.15599{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 30005.72329{txt}{col 55}Root MSE      = {res}   9.394

{txt}{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}incumbvotesmajorp~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2} 8.713647{col 33}{space 2} 7.617373{col 44}{space 1}    1.14{col 53}{space 3}0.254{col 61}{space 4}-6.331366{col 74}{space 3} 23.75866
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   5.645
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0175
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  15.199
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   4.579
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncount_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}           76              76              0     {c |} 
     district_fixed {c |}            0             159            159 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
(430 real changes made)
capacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 23 singleton observations)
{res}{txt}(converged in 9 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_capacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       407
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    127{txt}){col 67}= {res}      8.55
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0041
{txt}{col 51}R-squared{col 67}= {res}    0.8603
{txt}{col 51}Adj R-squared{col 67}= {res}    0.7179
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1402
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       128{txt}{col 51}Root MSE{col 67}= {res}   85.4913

{txt}{ralign 78:(Std. Err. adjusted for {res:128} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_capaci~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 39.74813{col 26}{space 2} 13.59247{col 37}{space 1}    2.92{col 46}{space 3}0.004{col 54}{space 4} 12.85108{col 67}{space 3} 66.64518
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           77              77              0     {c |} 
 district_fixed {c |}            0             128            128 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       407
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    127{txt}){col 67}= {res}      2.56
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.1118
{txt}{col 51}R-squared{col 67}= {res}    0.7563
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5077
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0205
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       128{txt}{col 51}Root MSE{col 67}= {res}    7.8753

{txt}{ralign 86:(Std. Err. adjusted for {res:128} clusters in district_fixed)}
{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}incumbvotesmajorpe~t{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}-.0123712{col 34}{space 2} .0077268{col 45}{space 1}   -1.60{col 54}{space 3}0.112{col 62}{space 4}-.0276611{col 75}{space 3} .0029186
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           77              77              0     {c |} 
      district_fixed {c |}            0             128            128 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       407
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    127{txt}){col 67}= {res}      1.71
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.1936
{txt}{col 51}R-squared{col 67}= {res}    0.7553
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5058
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0167
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       128{txt}{col 51}Root MSE{col 67}= {res}    7.8907

{txt}{ralign 78:(Std. Err. adjusted for {res:128} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}incumbvote~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}-1.184725{col 26}{space 2} .9065702{col 37}{space 1}   -1.31{col 46}{space 3}0.194{col 54}{space 4}-2.978664{col 67}{space 3} .6092136
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           77              77              0     {c |} 
 district_fixed {c |}            0             128            128 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   127{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   127{txt})
{res}cum_capacity{col 14}{txt}|{col 18}{res}    8.55{col 28}  0.0041{col 37}{txt}|{col 42}{res}   10.64{col 51}  0.0011{col 60}{txt}|{col 65}{res}    8.55

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}6.47   {col 61}{txt}P-val={res}0.0109

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   53.67
Kleibergen-Paap Wald rk F statistic{col 65}    8.55

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}127{txt})={col 49}{res}   1.71{col 61}{txt}P-val={res}0.1936
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   2.12{col 61}{txt}P-val={res}0.1450
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.75{col 61}{txt}P-val={res}0.1862

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       128
{txt}Number of observations               N  = {res}       407
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   128{txt}{col 55}Number of obs = {res}     407
{txt}{col 55}F(  1,   127) = {res}    2.15
{txt}{col 55}Prob > F      = {res}  0.1453
{txt}Total (centered) SS     = {res} 12727.65962{txt}{col 55}Centered R2   = {res}  0.7461
{txt}Total (uncentered) SS   = {res} 12727.65962{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 12985.53013{txt}{col 55}Root MSE      = {res}   8.038

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}incumbvotesmajorpe~t{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}-.0298058{col 34}{space 2} .0203405{col 45}{space 1}   -1.47{col 54}{space 3}0.145{col 62}{space 4}-.0700559{col 75}{space 3} .0104443
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   6.474
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0109
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  53.665
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   8.551
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           77              77              0     {c |} 
      district_fixed {c |}            0             128            128 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
count
{err}(running historical version of reghdfe)
{res}{txt}(dropped 23 singleton observations)
{res}{txt}(converged in 10 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_count_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       407
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    127{txt}){col 67}= {res}      9.54
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0025
{txt}{col 51}R-squared{col 67}= {res}    0.9931
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9860
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1506
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       128{txt}{col 51}Root MSE{col 67}= {res}   49.4225

{txt}{ralign 78:(Std. Err. adjusted for {res:128} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_count_~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 23.95751{col 26}{space 2} 7.755332{col 37}{space 1}    3.09{col 46}{space 3}0.002{col 54}{space 4} 8.611103{col 67}{space 3} 39.30391
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           77              77              0     {c |} 
 district_fixed {c |}            0             128            128 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       407
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    127{txt}){col 67}= {res}      2.71
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.1025
{txt}{col 51}R-squared{col 67}= {res}    0.7562
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5076
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0204
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       128{txt}{col 51}Root MSE{col 67}= {res}    7.8759

{txt}{ralign 83:(Std. Err. adjusted for {res:128} clusters in district_fixed)}
{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}incumbvotesmajo~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2}-.0211958{col 31}{space 2} .0128853{col 42}{space 1}   -1.64{col 51}{space 3}0.102{col 59}{space 4}-.0466936{col 72}{space 3} .0043019
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           77              77              0     {c |} 
   district_fixed {c |}            0             128            128 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       407
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    127{txt}){col 67}= {res}      1.71
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.1936
{txt}{col 51}R-squared{col 67}= {res}    0.7553
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5058
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0167
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       128{txt}{col 51}Root MSE{col 67}= {res}    7.8907

{txt}{ralign 78:(Std. Err. adjusted for {res:128} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}incumbvote~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}-1.184725{col 26}{space 2} .9065702{col 37}{space 1}   -1.31{col 46}{space 3}0.194{col 54}{space 4}-2.978664{col 67}{space 3} .6092136
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           77              77              0     {c |} 
 district_fixed {c |}            0             128            128 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   127{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   127{txt})
{res}cum_count_tu{col 14}{txt}|{col 18}{res}    9.54{col 28}  0.0025{col 37}{txt}|{col 42}{res}   11.87{col 51}  0.0006{col 60}{txt}|{col 65}{res}    9.54

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}7.04   {col 61}{txt}P-val={res}0.0080

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   58.34
Kleibergen-Paap Wald rk F statistic{col 65}    9.54

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}127{txt})={col 49}{res}   1.71{col 61}{txt}P-val={res}0.1936
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   2.12{col 61}{txt}P-val={res}0.1450
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.75{col 61}{txt}P-val={res}0.1862

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       128
{txt}Number of observations               N  = {res}       407
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   128{txt}{col 55}Number of obs = {res}     407
{txt}{col 55}F(  1,   127) = {res}    2.11
{txt}{col 55}Prob > F      = {res}  0.1489
{txt}Total (centered) SS     = {res} 12727.65962{txt}{col 55}Centered R2   = {res}  0.7472
{txt}Total (uncentered) SS   = {res} 12727.65962{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 12929.44244{txt}{col 55}Root MSE      = {res}    8.02

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}incumbvotesmajo~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2}-.0494511{col 31}{space 2} .0340539{col 42}{space 1}   -1.45{col 51}{space 3}0.149{col 59}{space 4}-.1168377{col 72}{space 3} .0179355
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   7.042
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0080
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  58.336
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   9.543
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           77              77              0     {c |} 
   district_fixed {c |}            0             128            128 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncapacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 23 singleton observations)
{res}{txt}(converged in 10 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncapacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       407
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    127{txt}){col 67}= {res}      6.85
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0099
{txt}{col 51}R-squared{col 67}= {res}    0.8985
{txt}{col 51}Adj R-squared{col 67}= {res}    0.7949
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0433
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       128{txt}{col 51}Root MSE{col 67}= {res}    0.8845

{txt}{ralign 78:(Std. Err. adjusted for {res:128} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncapa~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .2165556{col 26}{space 2} .0827175{col 37}{space 1}    2.62{col 46}{space 3}0.010{col 54}{space 4} .0528726{col 67}{space 3} .3802387
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           77              77              0     {c |} 
 district_fixed {c |}            0             128            128 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       407
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    127{txt}){col 67}= {res}      1.07
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.3032
{txt}{col 51}R-squared{col 67}= {res}    0.7525
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5000
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0052
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       128{txt}{col 51}Root MSE{col 67}= {res}    7.9367

{txt}{ralign 88:(Std. Err. adjusted for {res:128} clusters in district_fixed)}
{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}incumbvotesmajorperc~t{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2}-.6350904{col 36}{space 2} .6143155{col 47}{space 1}   -1.03{col 56}{space 3}0.303{col 64}{space 4} -1.85071{col 77}{space 3} .5805291
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}           77              77              0     {c |} 
        district_fixed {c |}            0             128            128 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       407
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    127{txt}){col 67}= {res}      1.71
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.1936
{txt}{col 51}R-squared{col 67}= {res}    0.7553
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5058
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0167
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       128{txt}{col 51}Root MSE{col 67}= {res}    7.8907

{txt}{ralign 78:(Std. Err. adjusted for {res:128} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}incumbvote~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}-1.184725{col 26}{space 2} .9065702{col 37}{space 1}   -1.31{col 46}{space 3}0.194{col 54}{space 4}-2.978664{col 67}{space 3} .6092136
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           77              77              0     {c |} 
 district_fixed {c |}            0             128            128 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   127{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   127{txt})
{res}cum_lncapaci{col 14}{txt}|{col 18}{res}    6.85{col 28}  0.0099{col 37}{txt}|{col 42}{res}    8.52{col 51}  0.0035{col 60}{txt}|{col 65}{res}    6.85

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}6.92   {col 61}{txt}P-val={res}0.0085

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   14.88
Kleibergen-Paap Wald rk F statistic{col 65}    6.85

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}127{txt})={col 49}{res}   1.71{col 61}{txt}P-val={res}0.1936
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   2.12{col 61}{txt}P-val={res}0.1450
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.75{col 61}{txt}P-val={res}0.1862

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       128
{txt}Number of observations               N  = {res}       407
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   128{txt}{col 55}Number of obs = {res}     407
{txt}{col 55}F(  1,   127) = {res}    1.36
{txt}{col 55}Prob > F      = {res}  0.2455
{txt}Total (centered) SS     = {res} 12727.65962{txt}{col 55}Centered R2   = {res}  0.6773
{txt}Total (uncentered) SS   = {res} 12727.65962{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 16504.55237{txt}{col 55}Root MSE      = {res}   9.062

{txt}{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}incumbvotesmajorperc~t{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2}-5.470766{col 36}{space 2} 4.688679{col 47}{space 1}   -1.17{col 56}{space 3}0.245{col 64}{space 4}-14.74882{col 77}{space 3} 3.807283
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   6.918
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0085
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  14.883
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   6.854
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncapacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}           77              77              0     {c |} 
        district_fixed {c |}            0             128            128 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncount
{err}(running historical version of reghdfe)
{res}{txt}(dropped 23 singleton observations)
{res}{txt}(converged in 10 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncount_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       407
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    127{txt}){col 67}= {res}      6.67
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0109
{txt}{col 51}R-squared{col 67}= {res}    0.9281
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8547
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0455
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       128{txt}{col 51}Root MSE{col 67}= {res}    0.7836

{txt}{ralign 78:(Std. Err. adjusted for {res:128} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncoun~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1969568{col 26}{space 2} .0762443{col 37}{space 1}    2.58{col 46}{space 3}0.011{col 54}{space 4} .0460831{col 67}{space 3} .3478305
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           77              77              0     {c |} 
 district_fixed {c |}            0             128            128 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       407
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    127{txt}){col 67}= {res}      0.76
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.3846
{txt}{col 51}R-squared{col 67}= {res}    0.7521
{txt}{col 51}Adj R-squared{col 67}= {res}    0.4992
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0035
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       128{txt}{col 51}Root MSE{col 67}= {res}    7.9434

{txt}{ralign 85:(Std. Err. adjusted for {res:128} clusters in district_fixed)}
{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}incumbvotesmajorp~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2}-.5903859{col 33}{space 2} .6766364{col 44}{space 1}   -0.87{col 53}{space 3}0.385{col 61}{space 4}-1.929327{col 74}{space 3} .7485555
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}           77              77              0     {c |} 
     district_fixed {c |}            0             128            128 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       407
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    127{txt}){col 67}= {res}      1.71
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.1936
{txt}{col 51}R-squared{col 67}= {res}    0.7553
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5058
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0167
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       128{txt}{col 51}Root MSE{col 67}= {res}    7.8907

{txt}{ralign 78:(Std. Err. adjusted for {res:128} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}incumbvote~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}-1.184725{col 26}{space 2} .9065702{col 37}{space 1}   -1.31{col 46}{space 3}0.194{col 54}{space 4}-2.978664{col 67}{space 3} .6092136
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           77              77              0     {c |} 
 district_fixed {c |}            0             128            128 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   127{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   127{txt})
{res}cum_lncount_{col 14}{txt}|{col 18}{res}    6.67{col 28}  0.0109{col 37}{txt}|{col 42}{res}    8.30{col 51}  0.0040{col 60}{txt}|{col 65}{res}    6.67

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}6.79   {col 61}{txt}P-val={res}0.0092

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   15.68
Kleibergen-Paap Wald rk F statistic{col 65}    6.67

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}127{txt})={col 49}{res}   1.71{col 61}{txt}P-val={res}0.1936
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   2.12{col 61}{txt}P-val={res}0.1450
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.75{col 61}{txt}P-val={res}0.1862

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       128
{txt}Number of observations               N  = {res}       407
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   128{txt}{col 55}Number of obs = {res}     407
{txt}{col 55}F(  1,   127) = {res}    1.29
{txt}{col 55}Prob > F      = {res}  0.2587
{txt}Total (centered) SS     = {res} 12727.65962{txt}{col 55}Centered R2   = {res}  0.6777
{txt}Total (uncentered) SS   = {res} 12727.65962{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 16488.07856{txt}{col 55}Root MSE      = {res}   9.057

{txt}{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}incumbvotesmajorp~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2}-6.015153{col 33}{space 2} 5.301945{col 44}{space 1}   -1.13{col 53}{space 3}0.259{col 61}{space 4}-16.50675{col 74}{space 3}  4.47644
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   6.786
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0092
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  15.683
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   6.673
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncount_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}           77              77              0     {c |} 
     district_fixed {c |}            0             128            128 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)

{com}. 
. *------------ Export LaTeX regression tables - Heterogeneous Effects ---------*
. cd "$rootDir/$resultDir/Tables"
{res}/Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Results/Tables
{txt}
{com}. 
. ** Compare OLS and IV estimates
. * OLS
. esttab inc_capacity_Dem_ols inc_count_Dem_ols inc_capacity_Rep_ols inc_count_Rep_ols using Table4.tex, booktabs replace ///
>                 refcat(cum_capacity_turbine "\emph{c -(}Panel A: OLS{c )-}", nolabel) ///
>                 b(%9.3f) se noconstant noobs nonotes star(* 0.10 ** 0.05 *** 0.01) ///
>                 varlabels(cum_capacity_turbine "Cumulative capacity (MW)" cum_count_turbine "Cumulative count") varwidth(27) modelwidth(13) ///
>                 mtitles("Model" "Model" "Model" "Model") ///
>                 mgroups("Democratic Incumbent" "Republican Incumbent", pattern(1 0 1 0) prefix(\multicolumn{c -(}@span{c )-}{c -(}c{c )-}{c -(}) suffix({c )-}) span erepeat(\cmidrule(lr){c -(}@span{c )-})) ///
>                 width(\hsize)
{res}{txt}(output written to {browse  `"Table4.tex"'})

{com}.                 
. * IV
. esttab inc_capacity_Dem_iv inc_count_Dem_iv inc_capacity_Rep_iv inc_count_Rep_iv using Table4.tex, booktabs append ///
>                 nomtitles se noconstant nonotes legend nonumbers collabels(none) star(* 0.10 ** 0.05 *** 0.01) ///
>                 b(%9.3f) stats(N N_clust r2, labels("Observations" "Districts" "\(R^{c -(}2{c )-}\)") fmt(0 0 2)) ///
>                 varlabels(cum_capacity_turbine "Cumulative capacity (MW)" cum_count_turbine "Cumulative count") varwidth(27) modelwidth(13) ///
>                 refcat(cum_capacity_turbine "\emph{c -(}Panel B: IV{c )-}", nolabel) ///
>                 width(\hsize)
{res}{txt}(output written to {browse  `"Table4.tex"'})

{com}. 
. 
.                 
. *******************************************************************************
. /*                                                              TABLE A8                                                         */
. *******************************************************************************
. gen cali = 0
{txt}
{com}. replace cali = 1 if state == "California"
{txt}(212 real changes made)

{com}. 
. local outcome demvotesmajorpercent repvotesmajorpercent incumbvotesmajorpercent // outcome variable 
{txt}
{com}. local endogenous cum_capacity_turbine cum_count_turbine cum_lncapacity_turbine cum_lncount_turbine // endogenous variable
{txt}
{com}. local instrument inter // instrument
{txt}
{com}. local admin1_trend stateyear_fixed // geography * time trend
{txt}
{com}. local admin2 district_fixed // panel unit (cluster variable)
{txt}
{com}. 
. foreach y in `outcome' {c -(}
{txt}  2{com}.         // Create outcome variable label for storing estimates
.         local y_name = substr("`y'", 1, 3)
{txt}  3{com}.         
.         foreach x in `endogenous' {c -(}
{txt}  4{com}.                         // Create endogenous variable label for storing estimates
.                         tokenize "`x'", parse("_")
{txt}  5{com}.                         local x_name "`3'"
{txt}  6{com}.                         di "`x_name'"
{txt}  7{com}.                         
.                         // Run IV regression
.                         reghdfe `y' (`x' = `instrument') if cali == 0, absorb(`admin1_trend' `admin2') ffirst stages(first ols reduced) vce(cluster `admin2') old
{txt}  8{com}.                         
.                         // Store IV, first stage, OLS, reduced form estimates
.                         estimates store `y_name'_`x_name'_iv_noCA
{txt}  9{com}.                         estimates restore reghdfe_first1
{txt} 10{com}.                         estimates store `y_name'_`x_name'_first_noCA
{txt} 11{com}.                         estimates restore reghdfe_ols
{txt} 12{com}.                         estimates store `y_name'_`x_name'_ols_noCA
{txt} 13{com}.                         estimates restore reghdfe_reduced
{txt} 14{com}.                         estimates store `y_name'_`x_name'_reduced_noCA
{txt} 15{com}.                 {c )-}
{txt} 16{com}. {c )-}
capacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_capacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}     15.22
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0001
{txt}{col 51}R-squared{col 67}= {res}    0.7638
{txt}{col 51}Adj R-squared{col 67}= {res}    0.6345
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1392
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}  100.7682

{txt}{ralign 78:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_capaci~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 41.76634{col 26}{space 2} 10.70574{col 37}{space 1}    3.90{col 46}{space 3}0.000{col 54}{space 4} 20.67392{col 67}{space 3} 62.85877
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           95              95              0     {c |} 
 district_fixed {c |}            0             234            234 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}      4.55
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0339
{txt}{col 51}R-squared{col 67}= {res}    0.8952
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8378
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0063
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}    8.7832

{txt}{ralign 86:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}demvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2} .0064432{col 34}{space 2} .0030197{col 45}{space 1}    2.13{col 54}{space 3}0.034{col 62}{space 4} .0004938{col 75}{space 3} .0123927
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           95              95              0     {c |} 
      district_fixed {c |}            0             234            234 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}      6.09
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0143
{txt}{col 51}R-squared{col 67}= {res}    0.8957
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8386
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0112
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}    8.7617

{txt}{ralign 78:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}demvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .9594758{col 26}{space 2} .3889306{col 37}{space 1}    2.47{col 46}{space 3}0.014{col 54}{space 4} .1932056{col 67}{space 3} 1.725746
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           95              95              0     {c |} 
 district_fixed {c |}            0             234            234 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   233{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   233{txt})
{res}cum_capacity{col 14}{txt}|{col 18}{res}   15.22{col 28}  0.0001{col 37}{txt}|{col 42}{res}   17.02{col 51}  0.0000{col 60}{txt}|{col 65}{res}   15.22

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}10.95  {col 61}{txt}P-val={res}0.0009

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  135.01
Kleibergen-Paap Wald rk F statistic{col 65}   15.22

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}233{txt})={col 49}{res}   6.09{col 61}{txt}P-val={res}0.0143
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   6.81{col 61}{txt}P-val={res}0.0091
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   5.44{col 61}{txt}P-val={res}0.0197

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       234
{txt}Number of observations               N  = {res}       931
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   234{txt}{col 55}Number of obs = {res}     931
{txt}{col 55}F(  1,   233) = {res}    5.33
{txt}{col 55}Prob > F      = {res}  0.0219
{txt}Total (centered) SS     = {res} 46657.81669{txt}{col 55}Centered R2   = {res}  0.8908
{txt}Total (uncentered) SS   = {res} 46657.81669{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 48300.44463{txt}{col 55}Root MSE      = {res}   8.965

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}demvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2} .0229725{col 34}{space 2}  .009953{col 45}{space 1}    2.31{col 54}{space 3}0.022{col 62}{space 4} .0033632{col 75}{space 3} .0425817
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  10.949
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0009
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 135.015
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  15.220
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           95              95              0     {c |} 
      district_fixed {c |}            0             234            234 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
count
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_count_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}     14.09
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0002
{txt}{col 51}R-squared{col 67}= {res}    0.8278
{txt}{col 51}Adj R-squared{col 67}= {res}    0.7335
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1434
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}   58.7043

{txt}{ralign 78:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_count_~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 24.75986{col 26}{space 2} 6.596948{col 37}{space 1}    3.75{col 46}{space 3}0.000{col 54}{space 4} 11.76257{col 67}{space 3} 37.75715
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           95              95              0     {c |} 
 district_fixed {c |}            0             234            234 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}      5.15
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0241
{txt}{col 51}R-squared{col 67}= {res}    0.8952
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8379
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0068
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}    8.7812

{txt}{ralign 83:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}demvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} .0114135{col 31}{space 2}  .005028{col 42}{space 1}    2.27{col 51}{space 3}0.024{col 59}{space 4} .0015074{col 72}{space 3} .0213196
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           95              95              0     {c |} 
   district_fixed {c |}            0             234            234 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}      6.09
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0143
{txt}{col 51}R-squared{col 67}= {res}    0.8957
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8386
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0112
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}    8.7617

{txt}{ralign 78:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}demvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .9594758{col 26}{space 2} .3889306{col 37}{space 1}    2.47{col 46}{space 3}0.014{col 54}{space 4} .1932056{col 67}{space 3} 1.725746
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           95              95              0     {c |} 
 district_fixed {c |}            0             234            234 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   233{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   233{txt})
{res}cum_count_tu{col 14}{txt}|{col 18}{res}   14.09{col 28}  0.0002{col 37}{txt}|{col 42}{res}   15.76{col 51}  0.0001{col 60}{txt}|{col 65}{res}   14.09

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}10.26  {col 61}{txt}P-val={res}0.0014

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  139.81
Kleibergen-Paap Wald rk F statistic{col 65}   14.09

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}233{txt})={col 49}{res}   6.09{col 61}{txt}P-val={res}0.0143
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   6.81{col 61}{txt}P-val={res}0.0091
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   5.44{col 61}{txt}P-val={res}0.0197

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       234
{txt}Number of observations               N  = {res}       931
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   234{txt}{col 55}Number of obs = {res}     931
{txt}{col 55}F(  1,   233) = {res}    5.00
{txt}{col 55}Prob > F      = {res}  0.0264
{txt}Total (centered) SS     = {res} 46657.81669{txt}{col 55}Centered R2   = {res}  0.8911
{txt}Total (uncentered) SS   = {res} 46657.81669{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 48149.89345{txt}{col 55}Root MSE      = {res}   8.951

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}demvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} .0387513{col 31}{space 2} .0173367{col 42}{space 1}    2.24{col 51}{space 3}0.026{col 59}{space 4} .0045946{col 72}{space 3} .0729079
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  10.260
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0014
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 139.808
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  14.087
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           95              95              0     {c |} 
   district_fixed {c |}            0             234            234 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncapacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncapacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}     22.15
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0000
{txt}{col 51}R-squared{col 67}= {res}    0.8596
{txt}{col 51}Adj R-squared{col 67}= {res}    0.7827
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0420
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}    0.7729

{txt}{ralign 78:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncapa~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1667911{col 26}{space 2} .0354364{col 37}{space 1}    4.71{col 46}{space 3}0.000{col 54}{space 4} .0969743{col 67}{space 3} .2366078
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           95              95              0     {c |} 
 district_fixed {c |}            0             234            234 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}      0.53
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.4658
{txt}{col 51}R-squared{col 67}= {res}    0.8946
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8370
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0011
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}    8.8060

{txt}{ralign 88:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}  demvotesmajorpercent{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2}-.3761456{col 36}{space 2} .5148489{col 47}{space 1}   -0.73{col 56}{space 3}0.466{col 64}{space 4}  -1.3905{col 77}{space 3} .6382085
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}           95              95              0     {c |} 
        district_fixed {c |}            0             234            234 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}      6.09
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0143
{txt}{col 51}R-squared{col 67}= {res}    0.8957
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8386
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0112
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}    8.7617

{txt}{ralign 78:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}demvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .9594758{col 26}{space 2} .3889306{col 37}{space 1}    2.47{col 46}{space 3}0.014{col 54}{space 4} .1932056{col 67}{space 3} 1.725746
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           95              95              0     {c |} 
 district_fixed {c |}            0             234            234 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   233{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   233{txt})
{res}cum_lncapaci{col 14}{txt}|{col 18}{res}   22.15{col 28}  0.0000{col 37}{txt}|{col 42}{res}   24.78{col 51}  0.0000{col 60}{txt}|{col 65}{res}   22.15

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}18.79  {col 61}{txt}P-val={res}0.0000

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   36.60
Kleibergen-Paap Wald rk F statistic{col 65}   22.15

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}233{txt})={col 49}{res}   6.09{col 61}{txt}P-val={res}0.0143
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   6.81{col 61}{txt}P-val={res}0.0091
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   5.44{col 61}{txt}P-val={res}0.0197

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       234
{txt}Number of observations               N  = {res}       931
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   234{txt}{col 55}Number of obs = {res}     931
{txt}{col 55}F(  1,   233) = {res}    4.98
{txt}{col 55}Prob > F      = {res}  0.0266
{txt}Total (centered) SS     = {res} 46657.81669{txt}{col 55}Centered R2   = {res}  0.8628
{txt}Total (uncentered) SS   = {res} 46657.81669{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 60682.69056{txt}{col 55}Root MSE      = {res}   10.05

{txt}{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}  demvotesmajorpercent{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2} 5.752562{col 36}{space 2} 2.577422{col 47}{space 1}    2.23{col 56}{space 3}0.027{col 64}{space 4} .6745304{col 77}{space 3} 10.83059
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  18.788
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0000
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  36.595
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  22.154
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncapacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}           95              95              0     {c |} 
        district_fixed {c |}            0             234            234 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncount
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncount_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}     23.72
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0000
{txt}{col 51}R-squared{col 67}= {res}    0.8802
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8146
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0473
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}    0.6702

{txt}{ralign 78:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncoun~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1540035{col 26}{space 2} .0316178{col 37}{space 1}    4.87{col 46}{space 3}0.000{col 54}{space 4} .0917101{col 67}{space 3} .2162969
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           95              95              0     {c |} 
 district_fixed {c |}            0             234            234 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}      0.34
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.5601
{txt}{col 51}R-squared{col 67}= {res}    0.8946
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8369
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0007
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}    8.8080

{txt}{ralign 85:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}demvotesmajorperc~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2}-.3320143{col 33}{space 2} .5689196{col 44}{space 1}   -0.58{col 53}{space 3}0.560{col 61}{space 4}-1.452898{col 74}{space 3} .7888697
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}           95              95              0     {c |} 
     district_fixed {c |}            0             234            234 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}      6.09
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0143
{txt}{col 51}R-squared{col 67}= {res}    0.8957
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8386
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0112
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}    8.7617

{txt}{ralign 78:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}demvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .9594758{col 26}{space 2} .3889306{col 37}{space 1}    2.47{col 46}{space 3}0.014{col 54}{space 4} .1932056{col 67}{space 3} 1.725746
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           95              95              0     {c |} 
 district_fixed {c |}            0             234            234 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   233{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   233{txt})
{res}cum_lncount_{col 14}{txt}|{col 18}{res}   23.72{col 28}  0.0000{col 37}{txt}|{col 42}{res}   26.54{col 51}  0.0000{col 60}{txt}|{col 65}{res}   23.72

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}20.03  {col 61}{txt}P-val={res}0.0000

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   41.50
Kleibergen-Paap Wald rk F statistic{col 65}   23.72

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}233{txt})={col 49}{res}   6.09{col 61}{txt}P-val={res}0.0143
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   6.81{col 61}{txt}P-val={res}0.0091
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   5.44{col 61}{txt}P-val={res}0.0197

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       234
{txt}Number of observations               N  = {res}       931
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   234{txt}{col 55}Number of obs = {res}     931
{txt}{col 55}F(  1,   233) = {res}    4.91
{txt}{col 55}Prob > F      = {res}  0.0276
{txt}Total (centered) SS     = {res} 46657.81669{txt}{col 55}Centered R2   = {res}  0.8670
{txt}Total (uncentered) SS   = {res} 46657.81669{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 58828.06195{txt}{col 55}Root MSE      = {res}   9.894

{txt}{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}demvotesmajorperc~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2}  6.23022{col 33}{space 2} 2.811266{col 44}{space 1}    2.22{col 53}{space 3}0.028{col 61}{space 4} .6914707{col 74}{space 3} 11.76897
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  20.031
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0000
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  41.502
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  23.724
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncount_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}           95              95              0     {c |} 
     district_fixed {c |}            0             234            234 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
capacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_capacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}     15.22
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0001
{txt}{col 51}R-squared{col 67}= {res}    0.7638
{txt}{col 51}Adj R-squared{col 67}= {res}    0.6345
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1392
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}  100.7682

{txt}{ralign 78:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_capaci~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 41.76634{col 26}{space 2} 10.70574{col 37}{space 1}    3.90{col 46}{space 3}0.000{col 54}{space 4} 20.67392{col 67}{space 3} 62.85877
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           95              95              0     {c |} 
 district_fixed {c |}            0             234            234 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}      4.55
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0339
{txt}{col 51}R-squared{col 67}= {res}    0.8952
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8378
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0063
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}    8.7832

{txt}{ralign 86:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}repvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}-.0064432{col 34}{space 2} .0030197{col 45}{space 1}   -2.13{col 54}{space 3}0.034{col 62}{space 4}-.0123927{col 75}{space 3}-.0004938
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           95              95              0     {c |} 
      district_fixed {c |}            0             234            234 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}      6.09
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0143
{txt}{col 51}R-squared{col 67}= {res}    0.8957
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8386
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0112
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}    8.7617

{txt}{ralign 78:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}repvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}-.9594758{col 26}{space 2} .3889306{col 37}{space 1}   -2.47{col 46}{space 3}0.014{col 54}{space 4}-1.725746{col 67}{space 3}-.1932056
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           95              95              0     {c |} 
 district_fixed {c |}            0             234            234 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   233{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   233{txt})
{res}cum_capacity{col 14}{txt}|{col 18}{res}   15.22{col 28}  0.0001{col 37}{txt}|{col 42}{res}   17.02{col 51}  0.0000{col 60}{txt}|{col 65}{res}   15.22

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}10.95  {col 61}{txt}P-val={res}0.0009

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  135.01
Kleibergen-Paap Wald rk F statistic{col 65}   15.22

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}233{txt})={col 49}{res}   6.09{col 61}{txt}P-val={res}0.0143
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   6.81{col 61}{txt}P-val={res}0.0091
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   5.44{col 61}{txt}P-val={res}0.0197

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       234
{txt}Number of observations               N  = {res}       931
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   234{txt}{col 55}Number of obs = {res}     931
{txt}{col 55}F(  1,   233) = {res}    5.33
{txt}{col 55}Prob > F      = {res}  0.0219
{txt}Total (centered) SS     = {res} 46657.81725{txt}{col 55}Centered R2   = {res}  0.8908
{txt}Total (uncentered) SS   = {res} 46657.81725{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 48300.44508{txt}{col 55}Root MSE      = {res}   8.965

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}repvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}-.0229725{col 34}{space 2}  .009953{col 45}{space 1}   -2.31{col 54}{space 3}0.022{col 62}{space 4}-.0425817{col 75}{space 3}-.0033632
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  10.949
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0009
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 135.015
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  15.220
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           95              95              0     {c |} 
      district_fixed {c |}            0             234            234 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
count
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_count_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}     14.09
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0002
{txt}{col 51}R-squared{col 67}= {res}    0.8278
{txt}{col 51}Adj R-squared{col 67}= {res}    0.7335
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1434
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}   58.7043

{txt}{ralign 78:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_count_~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 24.75986{col 26}{space 2} 6.596948{col 37}{space 1}    3.75{col 46}{space 3}0.000{col 54}{space 4} 11.76257{col 67}{space 3} 37.75715
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           95              95              0     {c |} 
 district_fixed {c |}            0             234            234 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}      5.15
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0241
{txt}{col 51}R-squared{col 67}= {res}    0.8952
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8379
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0068
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}    8.7812

{txt}{ralign 83:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}repvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2}-.0114135{col 31}{space 2}  .005028{col 42}{space 1}   -2.27{col 51}{space 3}0.024{col 59}{space 4}-.0213196{col 72}{space 3}-.0015074
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           95              95              0     {c |} 
   district_fixed {c |}            0             234            234 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}      6.09
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0143
{txt}{col 51}R-squared{col 67}= {res}    0.8957
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8386
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0112
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}    8.7617

{txt}{ralign 78:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}repvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}-.9594758{col 26}{space 2} .3889306{col 37}{space 1}   -2.47{col 46}{space 3}0.014{col 54}{space 4}-1.725746{col 67}{space 3}-.1932056
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           95              95              0     {c |} 
 district_fixed {c |}            0             234            234 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   233{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   233{txt})
{res}cum_count_tu{col 14}{txt}|{col 18}{res}   14.09{col 28}  0.0002{col 37}{txt}|{col 42}{res}   15.76{col 51}  0.0001{col 60}{txt}|{col 65}{res}   14.09

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}10.26  {col 61}{txt}P-val={res}0.0014

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  139.81
Kleibergen-Paap Wald rk F statistic{col 65}   14.09

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}233{txt})={col 49}{res}   6.09{col 61}{txt}P-val={res}0.0143
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   6.81{col 61}{txt}P-val={res}0.0091
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   5.44{col 61}{txt}P-val={res}0.0197

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       234
{txt}Number of observations               N  = {res}       931
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   234{txt}{col 55}Number of obs = {res}     931
{txt}{col 55}F(  1,   233) = {res}    5.00
{txt}{col 55}Prob > F      = {res}  0.0264
{txt}Total (centered) SS     = {res} 46657.81725{txt}{col 55}Centered R2   = {res}  0.8911
{txt}Total (uncentered) SS   = {res} 46657.81725{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res}  48149.8939{txt}{col 55}Root MSE      = {res}   8.951

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}repvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2}-.0387513{col 31}{space 2} .0173367{col 42}{space 1}   -2.24{col 51}{space 3}0.026{col 59}{space 4}-.0729079{col 72}{space 3}-.0045946
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  10.260
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0014
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 139.808
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  14.087
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           95              95              0     {c |} 
   district_fixed {c |}            0             234            234 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncapacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncapacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}     22.15
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0000
{txt}{col 51}R-squared{col 67}= {res}    0.8596
{txt}{col 51}Adj R-squared{col 67}= {res}    0.7827
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0420
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}    0.7729

{txt}{ralign 78:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncapa~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1667911{col 26}{space 2} .0354364{col 37}{space 1}    4.71{col 46}{space 3}0.000{col 54}{space 4} .0969743{col 67}{space 3} .2366078
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           95              95              0     {c |} 
 district_fixed {c |}            0             234            234 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}      0.53
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.4658
{txt}{col 51}R-squared{col 67}= {res}    0.8946
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8370
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0011
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}    8.8060

{txt}{ralign 88:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}  repvotesmajorpercent{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2} .3761456{col 36}{space 2} .5148489{col 47}{space 1}    0.73{col 56}{space 3}0.466{col 64}{space 4}-.6382086{col 77}{space 3}   1.3905
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}           95              95              0     {c |} 
        district_fixed {c |}            0             234            234 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}      6.09
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0143
{txt}{col 51}R-squared{col 67}= {res}    0.8957
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8386
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0112
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}    8.7617

{txt}{ralign 78:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}repvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}-.9594758{col 26}{space 2} .3889306{col 37}{space 1}   -2.47{col 46}{space 3}0.014{col 54}{space 4}-1.725746{col 67}{space 3}-.1932056
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           95              95              0     {c |} 
 district_fixed {c |}            0             234            234 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   233{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   233{txt})
{res}cum_lncapaci{col 14}{txt}|{col 18}{res}   22.15{col 28}  0.0000{col 37}{txt}|{col 42}{res}   24.78{col 51}  0.0000{col 60}{txt}|{col 65}{res}   22.15

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}18.79  {col 61}{txt}P-val={res}0.0000

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   36.60
Kleibergen-Paap Wald rk F statistic{col 65}   22.15

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}233{txt})={col 49}{res}   6.09{col 61}{txt}P-val={res}0.0143
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   6.81{col 61}{txt}P-val={res}0.0091
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   5.44{col 61}{txt}P-val={res}0.0197

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       234
{txt}Number of observations               N  = {res}       931
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   234{txt}{col 55}Number of obs = {res}     931
{txt}{col 55}F(  1,   233) = {res}    4.98
{txt}{col 55}Prob > F      = {res}  0.0266
{txt}Total (centered) SS     = {res} 46657.81725{txt}{col 55}Centered R2   = {res}  0.8628
{txt}Total (uncentered) SS   = {res} 46657.81725{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 60682.69112{txt}{col 55}Root MSE      = {res}   10.05

{txt}{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}  repvotesmajorpercent{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2}-5.752562{col 36}{space 2} 2.577422{col 47}{space 1}   -2.23{col 56}{space 3}0.027{col 64}{space 4}-10.83059{col 77}{space 3}-.6745304
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  18.788
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0000
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  36.595
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  22.154
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncapacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}           95              95              0     {c |} 
        district_fixed {c |}            0             234            234 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncount
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncount_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}     23.72
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0000
{txt}{col 51}R-squared{col 67}= {res}    0.8802
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8146
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0473
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}    0.6702

{txt}{ralign 78:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncoun~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1540035{col 26}{space 2} .0316178{col 37}{space 1}    4.87{col 46}{space 3}0.000{col 54}{space 4} .0917101{col 67}{space 3} .2162969
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           95              95              0     {c |} 
 district_fixed {c |}            0             234            234 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}      0.34
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.5601
{txt}{col 51}R-squared{col 67}= {res}    0.8946
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8369
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0007
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}    8.8080

{txt}{ralign 85:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}repvotesmajorperc~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2} .3320142{col 33}{space 2} .5689196{col 44}{space 1}    0.58{col 53}{space 3}0.560{col 61}{space 4}-.7888697{col 74}{space 3} 1.452898
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}           95              95              0     {c |} 
     district_fixed {c |}            0             234            234 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       931
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    233{txt}){col 67}= {res}      6.09
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0143
{txt}{col 51}R-squared{col 67}= {res}    0.8957
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8386
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0112
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       234{txt}{col 51}Root MSE{col 67}= {res}    8.7617

{txt}{ralign 78:(Std. Err. adjusted for {res:234} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}repvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}-.9594758{col 26}{space 2} .3889306{col 37}{space 1}   -2.47{col 46}{space 3}0.014{col 54}{space 4}-1.725746{col 67}{space 3}-.1932056
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           95              95              0     {c |} 
 district_fixed {c |}            0             234            234 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   233{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   233{txt})
{res}cum_lncount_{col 14}{txt}|{col 18}{res}   23.72{col 28}  0.0000{col 37}{txt}|{col 42}{res}   26.54{col 51}  0.0000{col 60}{txt}|{col 65}{res}   23.72

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}20.03  {col 61}{txt}P-val={res}0.0000

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   41.50
Kleibergen-Paap Wald rk F statistic{col 65}   23.72

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}233{txt})={col 49}{res}   6.09{col 61}{txt}P-val={res}0.0143
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   6.81{col 61}{txt}P-val={res}0.0091
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   5.44{col 61}{txt}P-val={res}0.0197

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       234
{txt}Number of observations               N  = {res}       931
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   234{txt}{col 55}Number of obs = {res}     931
{txt}{col 55}F(  1,   233) = {res}    4.91
{txt}{col 55}Prob > F      = {res}  0.0276
{txt}Total (centered) SS     = {res} 46657.81725{txt}{col 55}Centered R2   = {res}  0.8670
{txt}Total (uncentered) SS   = {res} 46657.81725{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 58828.06247{txt}{col 55}Root MSE      = {res}   9.894

{txt}{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}repvotesmajorperc~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2} -6.23022{col 33}{space 2} 2.811266{col 44}{space 1}   -2.22{col 53}{space 3}0.028{col 61}{space 4}-11.76897{col 74}{space 3}-.6914706
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  20.031
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0000
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  41.502
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  23.724
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncount_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}           95              95              0     {c |} 
     district_fixed {c |}            0             234            234 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
capacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 8 singleton observations)
{res}{txt}(converged in 8 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_capacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       838
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    231{txt}){col 67}= {res}     13.86
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0002
{txt}{col 51}R-squared{col 67}= {res}    0.7685
{txt}{col 51}Adj R-squared{col 67}= {res}    0.6245
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1328
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       232{txt}{col 51}Root MSE{col 67}= {res}  104.9973

{txt}{ralign 78:(Std. Err. adjusted for {res:232} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_capaci~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 42.73507{col 26}{space 2}  11.4786{col 37}{space 1}    3.72{col 46}{space 3}0.000{col 54}{space 4} 20.11893{col 67}{space 3} 65.35121
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           89              89              0     {c |} 
 district_fixed {c |}            0             232            232 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       838
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    231{txt}){col 67}= {res}      0.29
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.5876
{txt}{col 51}R-squared{col 67}= {res}    0.7406
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5792
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0004
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       232{txt}{col 51}Root MSE{col 67}= {res}    9.1506

{txt}{ralign 86:(Std. Err. adjusted for {res:232} clusters in district_fixed)}
{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}incumbvotesmajorpe~t{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}-.0015861{col 34}{space 2} .0029207{col 45}{space 1}   -0.54{col 54}{space 3}0.588{col 62}{space 4}-.0073406{col 75}{space 3} .0041684
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           89              89              0     {c |} 
      district_fixed {c |}            0             232            232 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       838
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    231{txt}){col 67}= {res}      1.29
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.2575
{txt}{col 51}R-squared{col 67}= {res}    0.7412
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5802
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0029
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       232{txt}{col 51}Root MSE{col 67}= {res}    9.1391

{txt}{ralign 78:(Std. Err. adjusted for {res:232} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}incumbvote~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .5115685{col 26}{space 2}  .450662{col 37}{space 1}    1.14{col 46}{space 3}0.257{col 54}{space 4}-.3763649{col 67}{space 3} 1.399502
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           89              89              0     {c |} 
 district_fixed {c |}            0             232            232 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   231{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   231{txt})
{res}cum_capacity{col 14}{txt}|{col 18}{res}   13.86{col 28}  0.0002{col 37}{txt}|{col 42}{res}   15.58{col 51}  0.0001{col 60}{txt}|{col 65}{res}   13.86

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}10.51  {col 61}{txt}P-val={res}0.0012

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  114.50
Kleibergen-Paap Wald rk F statistic{col 65}   13.86

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}231{txt})={col 49}{res}   1.29{col 61}{txt}P-val={res}0.2575
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.45{col 61}{txt}P-val={res}0.2288
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.45{col 61}{txt}P-val={res}0.2285

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       232
{txt}Number of observations               N  = {res}       838
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   232{txt}{col 55}Number of obs = {res}     838
{txt}{col 55}F(  1,   231) = {res}    1.03
{txt}{col 55}Prob > F      = {res}  0.3116
{txt}Total (centered) SS     = {res} 43222.94284{txt}{col 55}Centered R2   = {res}  0.7333
{txt}Total (uncentered) SS   = {res} 43222.94284{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 44411.97166{txt}{col 55}Root MSE      = {res}   9.277

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}incumbvotesmajorpe~t{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2} .0119707{col 34}{space 2} .0118043{col 45}{space 1}    1.01{col 54}{space 3}0.312{col 62}{space 4}-.0112872{col 75}{space 3} .0352286
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  10.505
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0012
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 114.503
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  13.861
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           89              89              0     {c |} 
      district_fixed {c |}            0             232            232 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
count
{err}(running historical version of reghdfe)
{res}{txt}(dropped 8 singleton observations)
{res}{txt}(converged in 8 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_count_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       838
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    231{txt}){col 67}= {res}     12.85
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0004
{txt}{col 51}R-squared{col 67}= {res}    0.8317
{txt}{col 51}Adj R-squared{col 67}= {res}    0.7271
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1395
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       232{txt}{col 51}Root MSE{col 67}= {res}   61.1979

{txt}{ralign 78:(Std. Err. adjusted for {res:232} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_count_~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 25.63616{col 26}{space 2} 7.152712{col 37}{space 1}    3.58{col 46}{space 3}0.000{col 54}{space 4} 11.54326{col 67}{space 3} 39.72905
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           89              89              0     {c |} 
 district_fixed {c |}            0             232            232 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       838
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    231{txt}){col 67}= {res}      0.52
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.4735
{txt}{col 51}R-squared{col 67}= {res}    0.7406
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5793
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0006
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       232{txt}{col 51}Root MSE{col 67}= {res}    9.1495

{txt}{ralign 83:(Std. Err. adjusted for {res:232} clusters in district_fixed)}
{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}incumbvotesmajo~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2}-.0034437{col 31}{space 2} .0047965{col 42}{space 1}   -0.72{col 51}{space 3}0.474{col 59}{space 4}-.0128942{col 72}{space 3} .0060068
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           89              89              0     {c |} 
   district_fixed {c |}            0             232            232 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       838
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    231{txt}){col 67}= {res}      1.29
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.2575
{txt}{col 51}R-squared{col 67}= {res}    0.7412
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5802
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0029
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       232{txt}{col 51}Root MSE{col 67}= {res}    9.1391

{txt}{ralign 78:(Std. Err. adjusted for {res:232} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}incumbvote~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .5115685{col 26}{space 2}  .450662{col 37}{space 1}    1.14{col 46}{space 3}0.257{col 54}{space 4}-.3763649{col 67}{space 3} 1.399502
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           89              89              0     {c |} 
 district_fixed {c |}            0             232            232 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   231{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   231{txt})
{res}cum_count_tu{col 14}{txt}|{col 18}{res}   12.85{col 28}  0.0004{col 37}{txt}|{col 42}{res}   14.44{col 51}  0.0001{col 60}{txt}|{col 65}{res}   12.85

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}9.72   {col 61}{txt}P-val={res}0.0018

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  121.29
Kleibergen-Paap Wald rk F statistic{col 65}   12.85

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}231{txt})={col 49}{res}   1.29{col 61}{txt}P-val={res}0.2575
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.45{col 61}{txt}P-val={res}0.2288
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.45{col 61}{txt}P-val={res}0.2285

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       232
{txt}Number of observations               N  = {res}       838
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   232{txt}{col 55}Number of obs = {res}     838
{txt}{col 55}F(  1,   231) = {res}    1.02
{txt}{col 55}Prob > F      = {res}  0.3141
{txt}Total (centered) SS     = {res} 43222.94284{txt}{col 55}Centered R2   = {res}  0.7333
{txt}Total (uncentered) SS   = {res} 43222.94284{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 44425.92518{txt}{col 55}Root MSE      = {res}   9.279

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}incumbvotesmajo~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2}  .019955{col 31}{space 2}   .01978{col 42}{space 1}    1.01{col 51}{space 3}0.314{col 59}{space 4}-.0190173{col 72}{space 3} .0589272
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   9.718
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0018
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 121.294
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  12.846
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           89              89              0     {c |} 
   district_fixed {c |}            0             232            232 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncapacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 8 singleton observations)
{res}{txt}(converged in 8 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncapacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       838
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    231{txt}){col 67}= {res}     16.17
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0001
{txt}{col 51}R-squared{col 67}= {res}    0.8693
{txt}{col 51}Adj R-squared{col 67}= {res}    0.7880
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0384
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       232{txt}{col 51}Root MSE{col 67}= {res}    0.7577

{txt}{ralign 78:(Std. Err. adjusted for {res:232} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncapa~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1574769{col 26}{space 2} .0391584{col 37}{space 1}    4.02{col 46}{space 3}0.000{col 54}{space 4} .0803237{col 67}{space 3} .2346301
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           89              89              0     {c |} 
 district_fixed {c |}            0             232            232 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       838
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    231{txt}){col 67}= {res}      0.86
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.3544
{txt}{col 51}R-squared{col 67}= {res}    0.7409
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5797
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0017
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       232{txt}{col 51}Root MSE{col 67}= {res}    9.1448

{txt}{ralign 88:(Std. Err. adjusted for {res:232} clusters in district_fixed)}
{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}incumbvotesmajorperc~t{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2}-.4822678{col 36}{space 2} .5197529{col 47}{space 1}   -0.93{col 56}{space 3}0.354{col 64}{space 4} -1.50633{col 77}{space 3} .5417945
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}           89              89              0     {c |} 
        district_fixed {c |}            0             232            232 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       838
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    231{txt}){col 67}= {res}      1.29
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.2575
{txt}{col 51}R-squared{col 67}= {res}    0.7412
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5802
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0029
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       232{txt}{col 51}Root MSE{col 67}= {res}    9.1391

{txt}{ralign 78:(Std. Err. adjusted for {res:232} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}incumbvote~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .5115685{col 26}{space 2}  .450662{col 37}{space 1}    1.14{col 46}{space 3}0.257{col 54}{space 4}-.3763649{col 67}{space 3} 1.399502
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           89              89              0     {c |} 
 district_fixed {c |}            0             232            232 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   231{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   231{txt})
{res}cum_lncapaci{col 14}{txt}|{col 18}{res}   16.17{col 28}  0.0001{col 37}{txt}|{col 42}{res}   18.18{col 51}  0.0000{col 60}{txt}|{col 65}{res}   16.17

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}16.08  {col 61}{txt}P-val={res}0.0001

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   29.86
Kleibergen-Paap Wald rk F statistic{col 65}   16.17

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}231{txt})={col 49}{res}   1.29{col 61}{txt}P-val={res}0.2575
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.45{col 61}{txt}P-val={res}0.2288
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.45{col 61}{txt}P-val={res}0.2285

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       232
{txt}Number of observations               N  = {res}       838
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   232{txt}{col 55}Number of obs = {res}     838
{txt}{col 55}F(  1,   231) = {res}    1.14
{txt}{col 55}Prob > F      = {res}  0.2864
{txt}Total (centered) SS     = {res} 43222.94284{txt}{col 55}Centered R2   = {res}  0.7152
{txt}Total (uncentered) SS   = {res} 43222.94284{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 47438.98014{txt}{col 55}Root MSE      = {res}   9.588

{txt}{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}incumbvotesmajorperc~t{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2} 3.248531{col 36}{space 2} 3.039891{col 47}{space 1}    1.07{col 56}{space 3}0.286{col 64}{space 4}-2.740926{col 77}{space 3} 9.237988
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  16.083
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0001
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  29.859
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  16.173
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncapacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}           89              89              0     {c |} 
        district_fixed {c |}            0             232            232 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncount
{err}(running historical version of reghdfe)
{res}{txt}(dropped 8 singleton observations)
{res}{txt}(converged in 8 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncount_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       838
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    231{txt}){col 67}= {res}     18.36
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0000
{txt}{col 51}R-squared{col 67}= {res}    0.8874
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8173
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0445
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       232{txt}{col 51}Root MSE{col 67}= {res}    0.6578

{txt}{ralign 78:(Std. Err. adjusted for {res:232} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncoun~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1476064{col 26}{space 2} .0344524{col 37}{space 1}    4.28{col 46}{space 3}0.000{col 54}{space 4} .0797254{col 67}{space 3} .2154875
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           89              89              0     {c |} 
 district_fixed {c |}            0             232            232 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       838
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    231{txt}){col 67}= {res}      0.35
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.5560
{txt}{col 51}R-squared{col 67}= {res}    0.7406
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5793
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0007
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       232{txt}{col 51}Root MSE{col 67}= {res}    9.1493

{txt}{ralign 85:(Std. Err. adjusted for {res:232} clusters in district_fixed)}
{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}incumbvotesmajorp~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2}-.3483409{col 33}{space 2} .5908203{col 44}{space 1}   -0.59{col 53}{space 3}0.556{col 61}{space 4}-1.512426{col 74}{space 3} .8157445
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}           89              89              0     {c |} 
     district_fixed {c |}            0             232            232 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}       838
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}    231{txt}){col 67}= {res}      1.29
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.2575
{txt}{col 51}R-squared{col 67}= {res}    0.7412
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5802
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0029
{txt}{col 1}Number of clusters ({res}district_fixed{txt}) {col 30}= {res}       232{txt}{col 51}Root MSE{col 67}= {res}    9.1391

{txt}{ralign 78:(Std. Err. adjusted for {res:232} clusters in district_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}incumbvote~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .5115685{col 26}{space 2}  .450662{col 37}{space 1}    1.14{col 46}{space 3}0.257{col 54}{space 4}-.3763649{col 67}{space 3} 1.399502
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}           89              89              0     {c |} 
 district_fixed {c |}            0             232            232 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}   231{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}   231{txt})
{res}cum_lncount_{col 14}{txt}|{col 18}{res}   18.36{col 28}  0.0000{col 37}{txt}|{col 42}{res}   20.63{col 51}  0.0000{col 60}{txt}|{col 65}{res}   18.36

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}17.87  {col 61}{txt}P-val={res}0.0000

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   34.80
Kleibergen-Paap Wald rk F statistic{col 65}   18.36

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}231{txt})={col 49}{res}   1.29{col 61}{txt}P-val={res}0.2575
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.45{col 61}{txt}P-val={res}0.2288
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   1.45{col 61}{txt}P-val={res}0.2285

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}       232
{txt}Number of observations               N  = {res}       838
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   232{txt}{col 55}Number of obs = {res}     838
{txt}{col 55}F(  1,   231) = {res}    1.18
{txt}{col 55}Prob > F      = {res}  0.2780
{txt}Total (centered) SS     = {res} 43222.94284{txt}{col 55}Centered R2   = {res}  0.7202
{txt}Total (uncentered) SS   = {res} 43222.94284{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 46593.80674{txt}{col 55}Root MSE      = {res}   9.503

{txt}{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}incumbvotesmajorp~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2}  3.46576{col 33}{space 2} 3.186961{col 44}{space 1}    1.09{col 53}{space 3}0.278{col 61}{space 4}-2.813467{col 74}{space 3} 9.744987
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  17.866
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0000
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  34.803
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  18.356
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncount_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}           89              89              0     {c |} 
     district_fixed {c |}            0             232            232 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)

{com}. 
. 
. *-------------------- Export LaTeX tables - Drop California --------------------*
. cd "$rootDir/$resultDir/Tables"
{res}/Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Results/Tables
{txt}
{com}.                 
. ** Compare OLS and IV estimates
. * OLS
. esttab dem_capacity_ols_noCA dem_count_ols_noCA rep_capacity_ols_noCA rep_count_ols_noCA ///
>                 inc_capacity_ols_noCA inc_count_ols_noCA using TableA8.tex, booktabs replace ///
>                 refcat(cum_capacity_turbine "\emph{c -(}Panel A: OLS{c )-}", nolabel) ///
>                 b(%9.3f) se noconstant noobs nonotes star(* 0.10 ** 0.05 *** 0.01) ///
>                 varlabels(cum_capacity_turbine "Cumulative capacity (MW)" cum_count_turbine "Cumulative count") varwidth(27) modelwidth(13) ///
>                 mtitles("Model" "Model" "Model" "Model" "Model" "Model") ///
>                 mgroups("Democratic Vote" "Republican Vote" "Incumbent Vote", pattern(1 0 1 0 1 0) prefix(\multicolumn{c -(}@span{c )-}{c -(}c{c )-}{c -(}) suffix({c )-}) span erepeat(\cmidrule(lr){c -(}@span{c )-})) ///
>                 width(\hsize)
{res}{txt}(output written to {browse  `"TableA8.tex"'})

{com}.                 
. * IV
. esttab dem_capacity_iv_noCA dem_count_iv_noCA rep_capacity_iv_noCA rep_count_iv_noCA ///
>                 inc_capacity_iv_noCA inc_count_iv_noCA using TableA8.tex, booktabs append ///
>                 nomtitles se noconstant nonotes legend nonumbers collabels(none) star(* 0.10 ** 0.05 *** 0.01) ///
>                 b(%9.3f) stats(N N_clust r2, labels("Observations" "Districts" "\(R^{c -(}2{c )-}\)") fmt(0 0 2)) ///
>                 varlabels(cum_capacity_turbine "Cumulative capacity (MW)" cum_count_turbine "Cumulative count") varwidth(27) modelwidth(13) ///
>                 refcat(cum_capacity_turbine "\emph{c -(}Panel B: IV{c )-}", nolabel) ///
>                 width(\hsize)
{res}{txt}(output written to {browse  `"TableA8.tex"'})

{com}. 
. 
. *******************************************************************************
. /*                                                         TABLE A14                                                             */
. *******************************************************************************
. cd "$rootDir/$dataDir/Final"
{res}/Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Data/Final
{txt}
{com}. use ACS_panel_balanceTest_recodeVar.dta, clear
{txt}
{com}. 
. ** Merge w/t election period panel
. drop cum_count_turbine-GEOid2 
{txt}
{com}. merge 1:1 state district year using election_district_panel.dta, update
{res}{txt}(label _merge already defined)

{col 5}Result{col 38}# of obs.
{col 5}{hline 41}
{col 5}not matched{col 30}{res}           1,439
{txt}{col 9}from master{col 30}{res}           1,152{txt}  (_merge==1)
{col 9}from using{col 30}{res}             287{txt}  (_merge==2)

{col 5}matched{col 30}{res}             857
{txt}{col 9}not updated{col 30}{res}             857{txt}  (_merge==3)
{col 9}missing updated{col 30}{res}               0{txt}  (_merge==4)
{col 9}nonmissing conflict{col 30}{res}               0{txt}  (_merge==5)
{col 5}{hline 41}

{com}. keep if _merge == 3
{txt}(1,439 observations deleted)

{com}. 
. ** Create instrument and fixed effects
. gen t = year - 2003
{txt}
{com}. gen inter = t * mean_wp
{txt}
{com}. 
. egen stateyear_fixed = group(state year)
{txt}
{com}. egen district_fixed = group(state district)
{txt}
{com}. 
. gen cum_lncapacity_turbine = log(cum_capacity_turbine + 1)
{txt}
{com}. gen cum_lncount_turbine = log(cum_count_turbine +1 )
{txt}
{com}. 
. 
. ** Include balance variable as controls
. ** incumbent
. reghdfe incumbvotes pop white home_median (cum_capacity_turbine=inter), absorb(stateyear_fixed district_fixed) vce(cluster district_fixed) old
{err}(running historical version of reghdfe)
{res}{txt}(dropped 13 singleton observations)
{res}{txt}(converged in 9 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   279{txt}{col 55}Number of obs = {res}     765
{txt}{col 55}F(  4,   278) = {res}    1.94
{txt}{col 55}Prob > F      = {res}  0.1036
{txt}Total (centered) SS     = {res} 34073.93398{txt}{col 55}Centered R2   = {res}  0.7751
{txt}Total (uncentered) SS   = {res} 34073.93398{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 35218.35682{txt}{col 55}Root MSE      = {res}   9.234

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}incumbvotesmajorpe~t{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2} .0243432{col 34}{space 2}  .015943{col 45}{space 1}    1.53{col 54}{space 3}0.128{col 62}{space 4}-.0070411{col 75}{space 3} .0557276
{txt}{space 17}pop {c |}{col 22}{res}{space 2} .0542771{col 34}{space 2} .0308766{col 45}{space 1}    1.76{col 54}{space 3}0.080{col 62}{space 4}-.0065044{col 75}{space 3} .1150587
{txt}{space 15}white {c |}{col 22}{res}{space 2}-7.255705{col 34}{space 2} 19.17384{col 45}{space 1}   -0.38{col 54}{space 3}0.705{col 62}{space 4}-45.00007{col 75}{space 3} 30.48866
{txt}{space 9}home_median {c |}{col 22}{res}{space 2} .0150629{col 34}{space 2} .0178649{col 45}{space 1}    0.84{col 54}{space 3}0.400{col 62}{space 4}-.0201048{col 75}{space 3} .0502306
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  10.763
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0010
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  71.644
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  12.938
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Included instruments:{col 23}pop white home_median
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           69              69              0     {c |} 
      district_fixed {c |}            0             279            279 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}
{com}. estimates store inc_capacityB_iv
{txt}
{com}. 
. reghdfe incumbvotes pop white home_median (cum_count_turbine=inter), absorb(stateyear_fixed district_fixed) vce(cluster district_fixed) old
{err}(running historical version of reghdfe)
{res}{txt}(dropped 13 singleton observations)
{res}{txt}(converged in 9 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   279{txt}{col 55}Number of obs = {res}     765
{txt}{col 55}F(  4,   278) = {res}    1.93
{txt}{col 55}Prob > F      = {res}  0.1050
{txt}Total (centered) SS     = {res} 34073.93398{txt}{col 55}Centered R2   = {res}  0.7751
{txt}Total (uncentered) SS   = {res} 34073.93398{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 35221.55046{txt}{col 55}Root MSE      = {res}   9.235

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}incumbvotesmajo~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} .0413532{col 31}{space 2} .0273772{col 42}{space 1}    1.51{col 51}{space 3}0.132{col 59}{space 4}-.0125398{col 72}{space 3} .0952461
{txt}{space 14}pop {c |}{col 19}{res}{space 2} .0546596{col 31}{space 2} .0307737{col 42}{space 1}    1.78{col 51}{space 3}0.077{col 59}{space 4}-.0059196{col 72}{space 3} .1152387
{txt}{space 12}white {c |}{col 19}{res}{space 2}-6.817301{col 31}{space 2} 19.19835{col 42}{space 1}   -0.36{col 51}{space 3}0.723{col 59}{space 4}-44.60991{col 72}{space 3}  30.9753
{txt}{space 6}home_median {c |}{col 19}{res}{space 2} .0149352{col 31}{space 2}  .017861{col 42}{space 1}    0.84{col 51}{space 3}0.404{col 59}{space 4}-.0202247{col 72}{space 3} .0500952
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   9.614
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0019
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  75.156
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  11.488
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Included instruments:{col 23}pop white home_median
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           69              69              0     {c |} 
   district_fixed {c |}            0             279            279 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}
{com}. estimates store inc_countB_iv
{txt}
{com}. 
. ** dem
. reghdfe demvotesmajor pop white home_median (cum_capacity_turbine=inter), absorb(stateyear_fixed district_fixed) vce(cluster district_fixed) old
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}     856
{txt}{col 55}F(  4,   286) = {res}    2.44
{txt}{col 55}Prob > F      = {res}  0.0470
{txt}Total (centered) SS     = {res} 38572.69402{txt}{col 55}Centered R2   = {res}  0.8988
{txt}Total (uncentered) SS   = {res} 38572.69402{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 39772.85342{txt}{col 55}Root MSE      = {res}       9

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}demvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2} .0264587{col 34}{space 2} .0139635{col 45}{space 1}    1.89{col 54}{space 3}0.059{col 62}{space 4}-.0010255{col 75}{space 3} .0539429
{txt}{space 17}pop {c |}{col 22}{res}{space 2}-.0142273{col 34}{space 2} .0292576{col 45}{space 1}   -0.49{col 54}{space 3}0.627{col 62}{space 4}-.0718149{col 75}{space 3} .0433603
{txt}{space 15}white {c |}{col 22}{res}{space 2}-28.09939{col 34}{space 2} 23.29763{col 45}{space 1}   -1.21{col 54}{space 3}0.229{col 62}{space 4}-73.95597{col 75}{space 3} 17.75719
{txt}{space 9}home_median {c |}{col 22}{res}{space 2} .0320551{col 34}{space 2} .0169104{col 45}{space 1}    1.90{col 54}{space 3}0.059{col 62}{space 4}-.0012295{col 75}{space 3} .0653396
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.490
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0007
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  85.209
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  14.131
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Included instruments:{col 23}pop white home_median
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           74              74              0     {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}
{com}. estimates store dem_capacityB_iv
{txt}
{com}. 
. reghdfe demvotesmajor pop white home_median (cum_count_turbine=inter), absorb(stateyear_fixed district_fixed) vce(cluster district_fixed) old
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}     856
{txt}{col 55}F(  4,   286) = {res}    2.38
{txt}{col 55}Prob > F      = {res}  0.0518
{txt}Total (centered) SS     = {res} 38572.69402{txt}{col 55}Centered R2   = {res}  0.8990
{txt}Total (uncentered) SS   = {res} 38572.69402{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 39668.79781{txt}{col 55}Root MSE      = {res}   8.988

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}demvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} .0455632{col 31}{space 2} .0244301{col 42}{space 1}    1.87{col 51}{space 3}0.063{col 59}{space 4}-.0025224{col 72}{space 3} .0936488
{txt}{space 14}pop {c |}{col 19}{res}{space 2} -.014202{col 31}{space 2} .0292099{col 42}{space 1}   -0.49{col 51}{space 3}0.627{col 59}{space 4}-.0716957{col 72}{space 3} .0432917
{txt}{space 12}white {c |}{col 19}{res}{space 2}-27.82907{col 31}{space 2} 23.33588{col 42}{space 1}   -1.19{col 51}{space 3}0.234{col 59}{space 4}-73.76093{col 72}{space 3} 18.10279
{txt}{space 6}home_median {c |}{col 19}{res}{space 2} .0319485{col 31}{space 2} .0169317{col 42}{space 1}    1.89{col 51}{space 3}0.060{col 59}{space 4}-.0013779{col 72}{space 3}  .065275
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  10.527
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0012
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  86.811
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  12.734
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Included instruments:{col 23}pop white home_median
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           74              74              0     {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}
{com}. estimates store dem_countB_iv
{txt}
{com}. 
. ** rep
. reghdfe repvotesmajor pop white home_median (cum_capacity_turbine=inter), absorb(stateyear_fixed district_fixed) vce(cluster district_fixed) old
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}     856
{txt}{col 55}F(  4,   286) = {res}    2.44
{txt}{col 55}Prob > F      = {res}  0.0470
{txt}Total (centered) SS     = {res} 38572.69436{txt}{col 55}Centered R2   = {res}  0.8988
{txt}Total (uncentered) SS   = {res} 38572.69436{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 39772.85357{txt}{col 55}Root MSE      = {res}       9

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}repvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}-.0264587{col 34}{space 2} .0139635{col 45}{space 1}   -1.89{col 54}{space 3}0.059{col 62}{space 4}-.0539429{col 75}{space 3} .0010255
{txt}{space 17}pop {c |}{col 22}{res}{space 2} .0142273{col 34}{space 2} .0292576{col 45}{space 1}    0.49{col 54}{space 3}0.627{col 62}{space 4}-.0433603{col 75}{space 3} .0718149
{txt}{space 15}white {c |}{col 22}{res}{space 2} 28.09939{col 34}{space 2} 23.29764{col 45}{space 1}    1.21{col 54}{space 3}0.229{col 62}{space 4}-17.75719{col 75}{space 3} 73.95597
{txt}{space 9}home_median {c |}{col 22}{res}{space 2}-.0320551{col 34}{space 2} .0169104{col 45}{space 1}   -1.90{col 54}{space 3}0.059{col 62}{space 4}-.0653396{col 75}{space 3} .0012295
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.490
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0007
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  85.209
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  14.131
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Included instruments:{col 23}pop white home_median
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           74              74              0     {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}
{com}. estimates store rep_capacityB_iv
{txt}
{com}. 
. reghdfe repvotesmajor pop white home_median (cum_count_turbine=inter), absorb(stateyear_fixed district_fixed) vce(cluster district_fixed) old
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}     856
{txt}{col 55}F(  4,   286) = {res}    2.38
{txt}{col 55}Prob > F      = {res}  0.0518
{txt}Total (centered) SS     = {res} 38572.69436{txt}{col 55}Centered R2   = {res}  0.8990
{txt}Total (uncentered) SS   = {res} 38572.69436{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 39668.79795{txt}{col 55}Root MSE      = {res}   8.988

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}repvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2}-.0455632{col 31}{space 2} .0244301{col 42}{space 1}   -1.87{col 51}{space 3}0.063{col 59}{space 4}-.0936488{col 72}{space 3} .0025224
{txt}{space 14}pop {c |}{col 19}{res}{space 2}  .014202{col 31}{space 2} .0292099{col 42}{space 1}    0.49{col 51}{space 3}0.627{col 59}{space 4}-.0432917{col 72}{space 3} .0716957
{txt}{space 12}white {c |}{col 19}{res}{space 2} 27.82907{col 31}{space 2} 23.33588{col 42}{space 1}    1.19{col 51}{space 3}0.234{col 59}{space 4}-18.10278{col 72}{space 3} 73.76093
{txt}{space 6}home_median {c |}{col 19}{res}{space 2}-.0319485{col 31}{space 2} .0169317{col 42}{space 1}   -1.89{col 51}{space 3}0.060{col 59}{space 4} -.065275{col 72}{space 3} .0013779
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  10.527
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0012
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  86.811
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  12.734
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Included instruments:{col 23}pop white home_median
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           74              74              0     {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}
{com}. estimates store rep_countB_iv
{txt}
{com}. 
. 
. *--------------------- Export LaTeX regression tables -----------------------*
. cd "$rootDir/$resultDir/Tables"
{res}/Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Results/Tables
{txt}
{com}. 
. ** IV estimates only
. esttab dem_capacityB_iv dem_countB_iv rep_capacityB_iv rep_countB_iv ///
>                 inc_capacityB_iv inc_countB_iv using TableA14.tex, booktabs replace ///
>                 refcat(cum_capacity_turbine "\emph{c -(}Panel: IV{c )-}", nolabel) ///
>                 b(%9.3f) se noconstant nonotes legend star(* 0.10 ** 0.05 *** 0.01) ///
>                 varlabels(cum_capacity_turbine "Cumulative capacity (MW)" cum_count_turbine "Cumulative count" pop "Total population (thousand)" white "White (\%)" home_median "Median gross rent (\textdollar)",  ///
>                 elist(cum_capacity_turbine \addlinespace  cum_count_turbine \addlinespace  pop \addlinespace  white \addlinespace)) ///
>                 varwidth(27) modelwidth(13) order(cum_capacity_turbine cum_count_turbine pop white home_median)  ///
>                 stats(N N_clust r2, labels("Observations" "Districts" "\(R^{c -(}2{c )-}\)") fmt(0 0 2)) ///
>                 mtitles("Model" "Model" "Model" "Model" "Model" "Model") ///
>                 mgroups("Democratic Vote" "Republican Vote" "Incumbent Vote", pattern(1 0 1 0 1 0) prefix(\multicolumn{c -(}@span{c )-}{c -(}c{c )-}{c -(}) suffix({c )-}) span erepeat(\cmidrule(lr){c -(}@span{c )-})) ///
>                 width(\hsize)
{res}{txt}(output written to {browse  `"TableA14.tex"'})

{com}. 
. 
. *******************************************************************************
. /*                                                              TABLE A16                                                               */
. *******************************************************************************
. 
. ** Load election district panel
. cd "$rootDir/$dataDir/Final"
{res}/Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Data/Final
{txt}
{com}. use election_district_panel.dta, clear
{txt}
{com}. 
. ** Create instrument and fixed effects
. gen t = year - 2004
{txt}
{com}. gen inter_median = t * median_wp
{txt}
{com}. gen inter_max = t * max_wp
{txt}
{com}. 
. egen stateyear_fixed = group(state year)
{txt}
{com}. egen district_fixed = group(state district)
{txt}
{com}. 
. ** Compare median and max zonal wind potential as IV
. foreach var in median max {c -(}
{txt}  2{com}. 
. * incumbent
. reghdfe incumbvotes (cum_capacity_turbine=inter_`var'), absorb(stateyear_fixed district_fixed) vce(cluster district_fixed) old
{txt}  3{com}. estimates store inc_capacity_`var'_iv
{txt}  4{com}. 
. reghdfe incumbvotes (cum_count_turbine=inter_`var'), absorb(stateyear_fixed district_fixed) vce(cluster district_fixed) old
{txt}  5{com}. estimates store inc_count_`var'_iv
{txt}  6{com}. 
. ** dem
. reghdfe demvotesmajor (cum_capacity_turbine=inter_`var'), absorb(stateyear_fixed district_fixed) vce(cluster district_fixed) old
{txt}  7{com}. estimates store dem_capacity_`var'_iv
{txt}  8{com}. 
. reghdfe demvotesmajor (cum_count_turbine=inter_`var'), absorb(stateyear_fixed district_fixed) vce(cluster district_fixed) old
{txt}  9{com}. estimates store dem_count_`var'_iv
{txt} 10{com}. 
. ** rep
. reghdfe repvotesmajor (cum_capacity_turbine=inter_`var'), absorb(stateyear_fixed district_fixed) vce(cluster district_fixed) old
{txt} 11{com}. estimates store rep_capacity_`var'_iv
{txt} 12{com}. 
. reghdfe repvotesmajor (cum_count_turbine=inter_`var'), absorb(stateyear_fixed district_fixed) vce(cluster district_fixed) old
{txt} 13{com}. estimates store rep_count_`var'_iv
{txt} 14{com}. {c )-}
{err}(running historical version of reghdfe)
{res}{txt}(dropped 8 singleton observations)
{res}{txt}(converged in 8 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   285{txt}{col 55}Number of obs = {res}    1038
{txt}{col 55}F(  1,   284) = {res}    2.08
{txt}{col 55}Prob > F      = {res}  0.1504
{txt}Total (centered) SS     = {res} 53332.46938{txt}{col 55}Centered R2   = {res}  0.7184
{txt}Total (uncentered) SS   = {res} 53332.46938{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 57070.87916{txt}{col 55}Root MSE      = {res}   9.306

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}incumbvotesmajorpe~t{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2} .0220458{col 34}{space 2} .0152889{col 45}{space 1}    1.44{col 54}{space 3}0.150{col 62}{space 4}-.0080482{col 75}{space 3} .0521398
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  10.365
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0013
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  69.483
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  10.265
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}inter_median
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           93              93              0     {c |} 
      district_fixed {c |}            0             285            285 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 8 singleton observations)
{res}{txt}(converged in 8 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   285{txt}{col 55}Number of obs = {res}    1038
{txt}{col 55}F(  1,   284) = {res}    2.04
{txt}{col 55}Prob > F      = {res}  0.1540
{txt}Total (centered) SS     = {res} 53332.46938{txt}{col 55}Centered R2   = {res}  0.7181
{txt}Total (uncentered) SS   = {res} 53332.46938{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res}  57116.4879{txt}{col 55}Root MSE      = {res}    9.31

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}incumbvotesmajo~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} .0371666{col 31}{space 2} .0260022{col 42}{space 1}    1.43{col 51}{space 3}0.154{col 59}{space 4}-.0140148{col 72}{space 3} .0883481
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   9.952
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0016
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  71.372
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   9.898
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}inter_median
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           93              93              0     {c |} 
   district_fixed {c |}            0             285            285 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    4.28
{txt}{col 55}Prob > F      = {res}  0.0395
{txt}Total (centered) SS     = {res} 63447.09059{txt}{col 55}Centered R2   = {res}  0.8812
{txt}Total (uncentered) SS   = {res} 63447.09059{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 66488.09137{txt}{col 55}Root MSE      = {res}   9.378

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}demvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2} .0277663{col 34}{space 2} .0134266{col 45}{space 1}    2.07{col 54}{space 3}0.040{col 62}{space 4} .0013389{col 75}{space 3} .0541938
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.450
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0007
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  86.562
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  11.960
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}inter_median
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           99              99              0     {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    4.18
{txt}{col 55}Prob > F      = {res}  0.0417
{txt}Total (centered) SS     = {res} 63447.09059{txt}{col 55}Centered R2   = {res}  0.8816
{txt}Total (uncentered) SS   = {res} 63447.09059{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 66289.04458{txt}{col 55}Root MSE      = {res}   9.364

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}demvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} .0472563{col 31}{space 2} .0231053{col 42}{space 1}    2.05{col 51}{space 3}0.042{col 59}{space 4} .0017782{col 72}{space 3} .0927344
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  10.951
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0009
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  87.532
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  11.441
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}inter_median
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           99              99              0     {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    4.28
{txt}{col 55}Prob > F      = {res}  0.0395
{txt}Total (centered) SS     = {res}  63447.0914{txt}{col 55}Centered R2   = {res}  0.8812
{txt}Total (uncentered) SS   = {res}  63447.0914{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 66488.09196{txt}{col 55}Root MSE      = {res}   9.378

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}repvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}-.0277663{col 34}{space 2} .0134266{col 45}{space 1}   -2.07{col 54}{space 3}0.040{col 62}{space 4}-.0541938{col 75}{space 3}-.0013388
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.450
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0007
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  86.562
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  11.960
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}inter_median
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           99              99              0     {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    4.18
{txt}{col 55}Prob > F      = {res}  0.0417
{txt}Total (centered) SS     = {res}  63447.0914{txt}{col 55}Centered R2   = {res}  0.8816
{txt}Total (uncentered) SS   = {res}  63447.0914{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 66289.04516{txt}{col 55}Root MSE      = {res}   9.364

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}repvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2}-.0472563{col 31}{space 2} .0231053{col 42}{space 1}   -2.05{col 51}{space 3}0.042{col 59}{space 4}-.0927344{col 72}{space 3}-.0017782
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  10.951
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0009
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  87.532
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  11.441
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}inter_median
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           99              99              0     {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 8 singleton observations)
{res}{txt}(converged in 8 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   285{txt}{col 55}Number of obs = {res}    1038
{txt}{col 55}F(  1,   284) = {res}    1.36
{txt}{col 55}Prob > F      = {res}  0.2448
{txt}Total (centered) SS     = {res} 53332.46938{txt}{col 55}Centered R2   = {res}  0.7293
{txt}Total (uncentered) SS   = {res} 53332.46938{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 54862.13604{txt}{col 55}Root MSE      = {res}   9.124

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}incumbvotesmajorpe~t{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}-.0168526{col 34}{space 2} .0144582{col 45}{space 1}   -1.17{col 54}{space 3}0.245{col 62}{space 4}-.0453114{col 75}{space 3} .0116062
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  13.064
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0003
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  45.244
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  13.064
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}inter_max
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           93              93              0     {c |} 
      district_fixed {c |}            0             285            285 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 8 singleton observations)
{res}{txt}(converged in 8 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   285{txt}{col 55}Number of obs = {res}    1038
{txt}{col 55}F(  1,   284) = {res}    1.37
{txt}{col 55}Prob > F      = {res}  0.2427
{txt}Total (centered) SS     = {res} 53332.46938{txt}{col 55}Centered R2   = {res}  0.7303
{txt}Total (uncentered) SS   = {res} 53332.46938{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res}  54641.1358{txt}{col 55}Root MSE      = {res}   9.106

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}incumbvotesmajo~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2}-.0277183{col 31}{space 2} .0236758{col 42}{space 1}   -1.17{col 51}{space 3}0.243{col 59}{space 4}-.0743206{col 72}{space 3}  .018884
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  13.439
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0002
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  48.918
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  13.643
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}inter_max
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           93              93              0     {c |} 
   district_fixed {c |}            0             285            285 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    0.35
{txt}{col 55}Prob > F      = {res}  0.5533
{txt}Total (centered) SS     = {res} 63447.09059{txt}{col 55}Centered R2   = {res}  0.8870
{txt}Total (uncentered) SS   = {res} 63447.09059{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 63226.86184{txt}{col 55}Root MSE      = {res}   9.145

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}demvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2} .0093519{col 34}{space 2} .0157562{col 45}{space 1}    0.59{col 54}{space 3}0.553{col 62}{space 4}-.0216609{col 75}{space 3} .0403648
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  15.328
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0001
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  45.020
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  15.292
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}inter_max
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           99              99              0     {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    0.35
{txt}{col 55}Prob > F      = {res}  0.5525
{txt}Total (centered) SS     = {res} 63447.09059{txt}{col 55}Centered R2   = {res}  0.8872
{txt}Total (uncentered) SS   = {res} 63447.09059{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 63163.05667{txt}{col 55}Root MSE      = {res}   9.141

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}demvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} .0154626{col 31}{space 2}  .026002{col 42}{space 1}    0.59{col 51}{space 3}0.553{col 59}{space 4} -.035717{col 72}{space 3} .0666422
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  15.379
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0001
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  48.342
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  15.551
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}inter_max
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           99              99              0     {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    0.35
{txt}{col 55}Prob > F      = {res}  0.5533
{txt}Total (centered) SS     = {res}  63447.0914{txt}{col 55}Centered R2   = {res}  0.8870
{txt}Total (uncentered) SS   = {res}  63447.0914{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 63226.86255{txt}{col 55}Root MSE      = {res}   9.145

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}repvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}-.0093519{col 34}{space 2} .0157562{col 45}{space 1}   -0.59{col 54}{space 3}0.553{col 62}{space 4}-.0403648{col 75}{space 3} .0216609
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  15.328
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0001
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  45.020
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  15.292
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}inter_max
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           99              99              0     {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    0.35
{txt}{col 55}Prob > F      = {res}  0.5525
{txt}Total (centered) SS     = {res}  63447.0914{txt}{col 55}Centered R2   = {res}  0.8872
{txt}Total (uncentered) SS   = {res}  63447.0914{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 63163.05739{txt}{col 55}Root MSE      = {res}   9.141

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}repvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2}-.0154626{col 31}{space 2}  .026002{col 42}{space 1}   -0.59{col 51}{space 3}0.553{col 59}{space 4}-.0666422{col 72}{space 3}  .035717
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  15.379
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0001
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  48.342
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  15.551
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}inter_max
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           99              99              0     {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}
{com}. 
. 
. *--------------------- Export LaTeX regression tables -----------------------*
. cd "$rootDir/$resultDir/Tables"
{res}/Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Results/Tables
{txt}
{com}. 
. ** Median
. esttab dem_capacity_median_iv dem_count_median_iv rep_capacity_median_iv rep_count_median_iv ///
>                 inc_capacity_median_iv inc_count_median_iv using TableA16.tex, booktabs replace ///
>                 refcat(cum_capacity_turbine "\emph{c -(}IV: Median{c )-}", nolabel) ///
>                 b(%9.3f) se noconstant noobs nonotes star(* 0.10 ** 0.05 *** 0.01) ///
>                 varlabels(cum_capacity_turbine "Cumulative capacity (MW)" cum_count_turbine "Cumulative count") varwidth(27) modelwidth(13) ///
>                 mtitles("Model" "Model" "Model" "Model" "Model" "Model") ///
>                 mgroups("Democratic Vote" "Republican Vote" "Incumbent Vote", pattern(1 0 1 0 1 0) prefix(\multicolumn{c -(}@span{c )-}{c -(}c{c )-}{c -(}) suffix({c )-}) span erepeat(\cmidrule(lr){c -(}@span{c )-})) ///
>                 width(\hsize)
{res}{txt}(output written to {browse  `"TableA16.tex"'})

{com}. 
. ** Max
. esttab dem_capacity_max_iv dem_count_max_iv rep_capacity_max_iv rep_count_max_iv ///
>                 inc_capacity_max_iv inc_count_max_iv using TableA16.tex, booktabs append ///
>                 nomtitles se noconstant nonotes legend nonumbers collabels(none) star(* 0.10 ** 0.05 *** 0.01) ///
>                 b(%9.3f) stats(N N_clust r2, labels("Observations" "Districts" "\(R^{c -(}2{c )-}\)") fmt(0 0 2)) ///
>                 varlabels(cum_capacity_turbine "Cumulative capacity (MW)" cum_count_turbine "Cumulative count") varwidth(35) modelwidth(13) ///
>                 refcat(cum_capacity_turbine "\emph{c -(}IV: Maximum{c )-}", nolabel) ///
>                 width(\hsize)
{res}{txt}(output written to {browse  `"TableA16.tex"'})

{com}.                 
.                 
. *******************************************************************************
. /*                                                              FIGURE A3                                                                */
. *******************************************************************************
. 
. ** Load election district panel
. clear
{txt}
{com}. cd "$rootDir/$dataDir/Final"
{res}/Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Data/Final
{txt}
{com}. use election_district_panel.dta, clear
{txt}
{com}. 
. ** Create instrument and fixed effects
. gen t = year - 2004
{txt}
{com}. gen inter = t * mean_wp
{txt}
{com}. 
. egen stateyear_fixed = group(state year)
{txt}
{com}. egen district_fixed = group(state district)
{txt}
{com}. 
. tab stateyear_fixed, gen(d_sy)

{txt}group(state {c |}
      year) {c |}      Freq.     Percent        Cum.
{hline 12}{c +}{hline 35}
          1 {c |}{res}          8        0.70        0.70
{txt}          2 {c |}{res}          8        0.70        1.40
{txt}          3 {c |}{res}          8        0.70        2.10
{txt}          4 {c |}{res}          8        0.70        2.80
{txt}          5 {c |}{res}         53        4.63        7.43
{txt}          6 {c |}{res}         53        4.63       12.06
{txt}          7 {c |}{res}         53        4.63       16.70
{txt}          8 {c |}{res}         53        4.63       21.33
{txt}          9 {c |}{res}          7        0.61       21.94
{txt}         10 {c |}{res}          7        0.61       22.55
{txt}         11 {c |}{res}          7        0.61       23.16
{txt}         12 {c |}{res}          7        0.61       23.78
{txt}         13 {c |}{res}          2        0.17       23.95
{txt}         14 {c |}{res}          2        0.17       24.13
{txt}         15 {c |}{res}          2        0.17       24.30
{txt}         16 {c |}{res}          1        0.09       24.39
{txt}         17 {c |}{res}          2        0.17       24.56
{txt}         18 {c |}{res}          2        0.17       24.74
{txt}         19 {c |}{res}          2        0.17       24.91
{txt}         20 {c |}{res}          2        0.17       25.09
{txt}         21 {c |}{res}         19        1.66       26.75
{txt}         22 {c |}{res}         19        1.66       28.41
{txt}         23 {c |}{res}         18        1.57       29.98
{txt}         24 {c |}{res}         19        1.66       31.64
{txt}         25 {c |}{res}          9        0.79       32.43
{txt}         26 {c |}{res}          9        0.79       33.22
{txt}         27 {c |}{res}          9        0.79       34.00
{txt}         28 {c |}{res}          9        0.79       34.79
{txt}         29 {c |}{res}          4        0.35       35.14
{txt}         30 {c |}{res}          4        0.35       35.49
{txt}         31 {c |}{res}          4        0.35       35.84
{txt}         32 {c |}{res}          4        0.35       36.19
{txt}         33 {c |}{res}          8        0.70       36.89
{txt}         34 {c |}{res}          8        0.70       37.59
{txt}         35 {c |}{res}          8        0.70       38.29
{txt}         36 {c |}{res}          8        0.70       38.99
{txt}         37 {c |}{res}         10        0.87       39.86
{txt}         38 {c |}{res}         10        0.87       40.73
{txt}         39 {c |}{res}         10        0.87       41.61
{txt}         40 {c |}{res}         10        0.87       42.48
{txt}         41 {c |}{res}         15        1.31       43.79
{txt}         42 {c |}{res}         15        1.31       45.10
{txt}         43 {c |}{res}         15        1.31       46.42
{txt}         44 {c |}{res}         15        1.31       47.73
{txt}         45 {c |}{res}          8        0.70       48.43
{txt}         46 {c |}{res}          8        0.70       49.13
{txt}         47 {c |}{res}          8        0.70       49.83
{txt}         48 {c |}{res}          8        0.70       50.52
{txt}         49 {c |}{res}          9        0.79       51.31
{txt}         50 {c |}{res}          9        0.79       52.10
{txt}         51 {c |}{res}          9        0.79       52.88
{txt}         52 {c |}{res}          9        0.79       53.67
{txt}         53 {c |}{res}          3        0.26       53.93
{txt}         54 {c |}{res}          3        0.26       54.20
{txt}         55 {c |}{res}          3        0.26       54.46
{txt}         56 {c |}{res}          3        0.26       54.72
{txt}         57 {c |}{res}          2        0.17       54.90
{txt}         58 {c |}{res}          2        0.17       55.07
{txt}         59 {c |}{res}          2        0.17       55.24
{txt}         60 {c |}{res}          2        0.17       55.42
{txt}         61 {c |}{res}         13        1.14       56.56
{txt}         62 {c |}{res}         13        1.14       57.69
{txt}         63 {c |}{res}         13        1.14       58.83
{txt}         64 {c |}{res}         13        1.14       59.97
{txt}         65 {c |}{res}         29        2.53       62.50
{txt}         66 {c |}{res}         29        2.53       65.03
{txt}         67 {c |}{res}         28        2.45       67.48
{txt}         68 {c |}{res}         28        2.45       69.93
{txt}         69 {c |}{res}         13        1.14       71.07
{txt}         70 {c |}{res}         13        1.14       72.20
{txt}         71 {c |}{res}         13        1.14       73.34
{txt}         72 {c |}{res}         13        1.14       74.48
{txt}         73 {c |}{res}         18        1.57       76.05
{txt}         74 {c |}{res}         18        1.57       77.62
{txt}         75 {c |}{res}         18        1.57       79.20
{txt}         76 {c |}{res}         18        1.57       80.77
{txt}         77 {c |}{res}          5        0.44       81.21
{txt}         78 {c |}{res}          5        0.44       81.64
{txt}         79 {c |}{res}          5        0.44       82.08
{txt}         80 {c |}{res}          5        0.44       82.52
{txt}         81 {c |}{res}          5        0.44       82.95
{txt}         82 {c |}{res}          5        0.44       83.39
{txt}         83 {c |}{res}          5        0.44       83.83
{txt}         84 {c |}{res}          5        0.44       84.27
{txt}         85 {c |}{res}         19        1.66       85.93
{txt}         86 {c |}{res}         19        1.66       87.59
{txt}         87 {c |}{res}         19        1.66       89.25
{txt}         88 {c |}{res}         19        1.66       90.91
{txt}         89 {c |}{res}          9        0.79       91.70
{txt}         90 {c |}{res}          9        0.79       92.48
{txt}         91 {c |}{res}          9        0.79       93.27
{txt}         92 {c |}{res}          9        0.79       94.06
{txt}         93 {c |}{res}          9        0.79       94.84
{txt}         94 {c |}{res}          9        0.79       95.63
{txt}         95 {c |}{res}          9        0.79       96.42
{txt}         96 {c |}{res}          9        0.79       97.20
{txt}         97 {c |}{res}          8        0.70       97.90
{txt}         98 {c |}{res}          8        0.70       98.60
{txt}         99 {c |}{res}          8        0.70       99.30
{txt}        100 {c |}{res}          8        0.70      100.00
{txt}{hline 12}{c +}{hline 35}
      Total {c |}{res}      1,144      100.00
{txt}
{com}. tab district_fixed, gen(d_dist)

{txt}group(state {c |}
  district) {c |}      Freq.     Percent        Cum.
{hline 12}{c +}{hline 35}
          1 {c |}{res}          4        0.35        0.35
{txt}          2 {c |}{res}          4        0.35        0.70
{txt}          3 {c |}{res}          4        0.35        1.05
{txt}          4 {c |}{res}          4        0.35        1.40
{txt}          5 {c |}{res}          4        0.35        1.75
{txt}          6 {c |}{res}          4        0.35        2.10
{txt}          7 {c |}{res}          4        0.35        2.45
{txt}          8 {c |}{res}          4        0.35        2.80
{txt}          9 {c |}{res}          4        0.35        3.15
{txt}         10 {c |}{res}          4        0.35        3.50
{txt}         11 {c |}{res}          4        0.35        3.85
{txt}         12 {c |}{res}          4        0.35        4.20
{txt}         13 {c |}{res}          4        0.35        4.55
{txt}         14 {c |}{res}          4        0.35        4.90
{txt}         15 {c |}{res}          4        0.35        5.24
{txt}         16 {c |}{res}          4        0.35        5.59
{txt}         17 {c |}{res}          4        0.35        5.94
{txt}         18 {c |}{res}          4        0.35        6.29
{txt}         19 {c |}{res}          4        0.35        6.64
{txt}         20 {c |}{res}          4        0.35        6.99
{txt}         21 {c |}{res}          4        0.35        7.34
{txt}         22 {c |}{res}          4        0.35        7.69
{txt}         23 {c |}{res}          4        0.35        8.04
{txt}         24 {c |}{res}          4        0.35        8.39
{txt}         25 {c |}{res}          4        0.35        8.74
{txt}         26 {c |}{res}          4        0.35        9.09
{txt}         27 {c |}{res}          4        0.35        9.44
{txt}         28 {c |}{res}          4        0.35        9.79
{txt}         29 {c |}{res}          4        0.35       10.14
{txt}         30 {c |}{res}          4        0.35       10.49
{txt}         31 {c |}{res}          4        0.35       10.84
{txt}         32 {c |}{res}          4        0.35       11.19
{txt}         33 {c |}{res}          4        0.35       11.54
{txt}         34 {c |}{res}          4        0.35       11.89
{txt}         35 {c |}{res}          4        0.35       12.24
{txt}         36 {c |}{res}          4        0.35       12.59
{txt}         37 {c |}{res}          4        0.35       12.94
{txt}         38 {c |}{res}          4        0.35       13.29
{txt}         39 {c |}{res}          4        0.35       13.64
{txt}         40 {c |}{res}          4        0.35       13.99
{txt}         41 {c |}{res}          4        0.35       14.34
{txt}         42 {c |}{res}          4        0.35       14.69
{txt}         43 {c |}{res}          4        0.35       15.03
{txt}         44 {c |}{res}          4        0.35       15.38
{txt}         45 {c |}{res}          4        0.35       15.73
{txt}         46 {c |}{res}          4        0.35       16.08
{txt}         47 {c |}{res}          4        0.35       16.43
{txt}         48 {c |}{res}          4        0.35       16.78
{txt}         49 {c |}{res}          4        0.35       17.13
{txt}         50 {c |}{res}          4        0.35       17.48
{txt}         51 {c |}{res}          4        0.35       17.83
{txt}         52 {c |}{res}          4        0.35       18.18
{txt}         53 {c |}{res}          4        0.35       18.53
{txt}         54 {c |}{res}          4        0.35       18.88
{txt}         55 {c |}{res}          4        0.35       19.23
{txt}         56 {c |}{res}          4        0.35       19.58
{txt}         57 {c |}{res}          4        0.35       19.93
{txt}         58 {c |}{res}          4        0.35       20.28
{txt}         59 {c |}{res}          4        0.35       20.63
{txt}         60 {c |}{res}          4        0.35       20.98
{txt}         61 {c |}{res}          4        0.35       21.33
{txt}         62 {c |}{res}          4        0.35       21.68
{txt}         63 {c |}{res}          4        0.35       22.03
{txt}         64 {c |}{res}          4        0.35       22.38
{txt}         65 {c |}{res}          4        0.35       22.73
{txt}         66 {c |}{res}          4        0.35       23.08
{txt}         67 {c |}{res}          4        0.35       23.43
{txt}         68 {c |}{res}          4        0.35       23.78
{txt}         69 {c |}{res}          3        0.26       24.04
{txt}         70 {c |}{res}          4        0.35       24.39
{txt}         71 {c |}{res}          4        0.35       24.74
{txt}         72 {c |}{res}          4        0.35       25.09
{txt}         73 {c |}{res}          4        0.35       25.44
{txt}         74 {c |}{res}          4        0.35       25.79
{txt}         75 {c |}{res}          4        0.35       26.14
{txt}         76 {c |}{res}          4        0.35       26.49
{txt}         77 {c |}{res}          3        0.26       26.75
{txt}         78 {c |}{res}          4        0.35       27.10
{txt}         79 {c |}{res}          4        0.35       27.45
{txt}         80 {c |}{res}          4        0.35       27.80
{txt}         81 {c |}{res}          4        0.35       28.15
{txt}         82 {c |}{res}          4        0.35       28.50
{txt}         83 {c |}{res}          4        0.35       28.85
{txt}         84 {c |}{res}          4        0.35       29.20
{txt}         85 {c |}{res}          4        0.35       29.55
{txt}         86 {c |}{res}          4        0.35       29.90
{txt}         87 {c |}{res}          4        0.35       30.24
{txt}         88 {c |}{res}          4        0.35       30.59
{txt}         89 {c |}{res}          4        0.35       30.94
{txt}         90 {c |}{res}          4        0.35       31.29
{txt}         91 {c |}{res}          4        0.35       31.64
{txt}         92 {c |}{res}          4        0.35       31.99
{txt}         93 {c |}{res}          4        0.35       32.34
{txt}         94 {c |}{res}          4        0.35       32.69
{txt}         95 {c |}{res}          4        0.35       33.04
{txt}         96 {c |}{res}          4        0.35       33.39
{txt}         97 {c |}{res}          4        0.35       33.74
{txt}         98 {c |}{res}          4        0.35       34.09
{txt}         99 {c |}{res}          4        0.35       34.44
{txt}        100 {c |}{res}          4        0.35       34.79
{txt}        101 {c |}{res}          4        0.35       35.14
{txt}        102 {c |}{res}          4        0.35       35.49
{txt}        103 {c |}{res}          4        0.35       35.84
{txt}        104 {c |}{res}          4        0.35       36.19
{txt}        105 {c |}{res}          4        0.35       36.54
{txt}        106 {c |}{res}          4        0.35       36.89
{txt}        107 {c |}{res}          4        0.35       37.24
{txt}        108 {c |}{res}          4        0.35       37.59
{txt}        109 {c |}{res}          4        0.35       37.94
{txt}        110 {c |}{res}          4        0.35       38.29
{txt}        111 {c |}{res}          4        0.35       38.64
{txt}        112 {c |}{res}          4        0.35       38.99
{txt}        113 {c |}{res}          4        0.35       39.34
{txt}        114 {c |}{res}          4        0.35       39.69
{txt}        115 {c |}{res}          4        0.35       40.03
{txt}        116 {c |}{res}          4        0.35       40.38
{txt}        117 {c |}{res}          4        0.35       40.73
{txt}        118 {c |}{res}          4        0.35       41.08
{txt}        119 {c |}{res}          4        0.35       41.43
{txt}        120 {c |}{res}          4        0.35       41.78
{txt}        121 {c |}{res}          4        0.35       42.13
{txt}        122 {c |}{res}          4        0.35       42.48
{txt}        123 {c |}{res}          4        0.35       42.83
{txt}        124 {c |}{res}          4        0.35       43.18
{txt}        125 {c |}{res}          4        0.35       43.53
{txt}        126 {c |}{res}          4        0.35       43.88
{txt}        127 {c |}{res}          4        0.35       44.23
{txt}        128 {c |}{res}          4        0.35       44.58
{txt}        129 {c |}{res}          4        0.35       44.93
{txt}        130 {c |}{res}          4        0.35       45.28
{txt}        131 {c |}{res}          4        0.35       45.63
{txt}        132 {c |}{res}          4        0.35       45.98
{txt}        133 {c |}{res}          4        0.35       46.33
{txt}        134 {c |}{res}          4        0.35       46.68
{txt}        135 {c |}{res}          4        0.35       47.03
{txt}        136 {c |}{res}          4        0.35       47.38
{txt}        137 {c |}{res}          4        0.35       47.73
{txt}        138 {c |}{res}          4        0.35       48.08
{txt}        139 {c |}{res}          4        0.35       48.43
{txt}        140 {c |}{res}          4        0.35       48.78
{txt}        141 {c |}{res}          4        0.35       49.13
{txt}        142 {c |}{res}          4        0.35       49.48
{txt}        143 {c |}{res}          4        0.35       49.83
{txt}        144 {c |}{res}          4        0.35       50.17
{txt}        145 {c |}{res}          4        0.35       50.52
{txt}        146 {c |}{res}          4        0.35       50.87
{txt}        147 {c |}{res}          4        0.35       51.22
{txt}        148 {c |}{res}          4        0.35       51.57
{txt}        149 {c |}{res}          4        0.35       51.92
{txt}        150 {c |}{res}          4        0.35       52.27
{txt}        151 {c |}{res}          4        0.35       52.62
{txt}        152 {c |}{res}          4        0.35       52.97
{txt}        153 {c |}{res}          4        0.35       53.32
{txt}        154 {c |}{res}          4        0.35       53.67
{txt}        155 {c |}{res}          4        0.35       54.02
{txt}        156 {c |}{res}          4        0.35       54.37
{txt}        157 {c |}{res}          4        0.35       54.72
{txt}        158 {c |}{res}          4        0.35       55.07
{txt}        159 {c |}{res}          4        0.35       55.42
{txt}        160 {c |}{res}          4        0.35       55.77
{txt}        161 {c |}{res}          4        0.35       56.12
{txt}        162 {c |}{res}          4        0.35       56.47
{txt}        163 {c |}{res}          4        0.35       56.82
{txt}        164 {c |}{res}          4        0.35       57.17
{txt}        165 {c |}{res}          4        0.35       57.52
{txt}        166 {c |}{res}          4        0.35       57.87
{txt}        167 {c |}{res}          4        0.35       58.22
{txt}        168 {c |}{res}          4        0.35       58.57
{txt}        169 {c |}{res}          4        0.35       58.92
{txt}        170 {c |}{res}          4        0.35       59.27
{txt}        171 {c |}{res}          4        0.35       59.62
{txt}        172 {c |}{res}          4        0.35       59.97
{txt}        173 {c |}{res}          4        0.35       60.31
{txt}        174 {c |}{res}          4        0.35       60.66
{txt}        175 {c |}{res}          4        0.35       61.01
{txt}        176 {c |}{res}          4        0.35       61.36
{txt}        177 {c |}{res}          4        0.35       61.71
{txt}        178 {c |}{res}          4        0.35       62.06
{txt}        179 {c |}{res}          4        0.35       62.41
{txt}        180 {c |}{res}          4        0.35       62.76
{txt}        181 {c |}{res}          4        0.35       63.11
{txt}        182 {c |}{res}          4        0.35       63.46
{txt}        183 {c |}{res}          4        0.35       63.81
{txt}        184 {c |}{res}          4        0.35       64.16
{txt}        185 {c |}{res}          4        0.35       64.51
{txt}        186 {c |}{res}          4        0.35       64.86
{txt}        187 {c |}{res}          4        0.35       65.21
{txt}        188 {c |}{res}          4        0.35       65.56
{txt}        189 {c |}{res}          4        0.35       65.91
{txt}        190 {c |}{res}          4        0.35       66.26
{txt}        191 {c |}{res}          4        0.35       66.61
{txt}        192 {c |}{res}          3        0.26       66.87
{txt}        193 {c |}{res}          4        0.35       67.22
{txt}        194 {c |}{res}          4        0.35       67.57
{txt}        195 {c |}{res}          4        0.35       67.92
{txt}        196 {c |}{res}          4        0.35       68.27
{txt}        197 {c |}{res}          4        0.35       68.62
{txt}        198 {c |}{res}          3        0.26       68.88
{txt}        199 {c |}{res}          4        0.35       69.23
{txt}        200 {c |}{res}          4        0.35       69.58
{txt}        201 {c |}{res}          4        0.35       69.93
{txt}        202 {c |}{res}          4        0.35       70.28
{txt}        203 {c |}{res}          4        0.35       70.63
{txt}        204 {c |}{res}          4        0.35       70.98
{txt}        205 {c |}{res}          4        0.35       71.33
{txt}        206 {c |}{res}          4        0.35       71.68
{txt}        207 {c |}{res}          4        0.35       72.03
{txt}        208 {c |}{res}          4        0.35       72.38
{txt}        209 {c |}{res}          4        0.35       72.73
{txt}        210 {c |}{res}          4        0.35       73.08
{txt}        211 {c |}{res}          4        0.35       73.43
{txt}        212 {c |}{res}          4        0.35       73.78
{txt}        213 {c |}{res}          4        0.35       74.13
{txt}        214 {c |}{res}          4        0.35       74.48
{txt}        215 {c |}{res}          4        0.35       74.83
{txt}        216 {c |}{res}          4        0.35       75.17
{txt}        217 {c |}{res}          4        0.35       75.52
{txt}        218 {c |}{res}          4        0.35       75.87
{txt}        219 {c |}{res}          4        0.35       76.22
{txt}        220 {c |}{res}          4        0.35       76.57
{txt}        221 {c |}{res}          4        0.35       76.92
{txt}        222 {c |}{res}          4        0.35       77.27
{txt}        223 {c |}{res}          4        0.35       77.62
{txt}        224 {c |}{res}          4        0.35       77.97
{txt}        225 {c |}{res}          4        0.35       78.32
{txt}        226 {c |}{res}          4        0.35       78.67
{txt}        227 {c |}{res}          4        0.35       79.02
{txt}        228 {c |}{res}          4        0.35       79.37
{txt}        229 {c |}{res}          4        0.35       79.72
{txt}        230 {c |}{res}          4        0.35       80.07
{txt}        231 {c |}{res}          4        0.35       80.42
{txt}        232 {c |}{res}          4        0.35       80.77
{txt}        233 {c |}{res}          4        0.35       81.12
{txt}        234 {c |}{res}          4        0.35       81.47
{txt}        235 {c |}{res}          4        0.35       81.82
{txt}        236 {c |}{res}          4        0.35       82.17
{txt}        237 {c |}{res}          4        0.35       82.52
{txt}        238 {c |}{res}          4        0.35       82.87
{txt}        239 {c |}{res}          4        0.35       83.22
{txt}        240 {c |}{res}          4        0.35       83.57
{txt}        241 {c |}{res}          4        0.35       83.92
{txt}        242 {c |}{res}          4        0.35       84.27
{txt}        243 {c |}{res}          4        0.35       84.62
{txt}        244 {c |}{res}          4        0.35       84.97
{txt}        245 {c |}{res}          4        0.35       85.31
{txt}        246 {c |}{res}          4        0.35       85.66
{txt}        247 {c |}{res}          4        0.35       86.01
{txt}        248 {c |}{res}          4        0.35       86.36
{txt}        249 {c |}{res}          4        0.35       86.71
{txt}        250 {c |}{res}          4        0.35       87.06
{txt}        251 {c |}{res}          4        0.35       87.41
{txt}        252 {c |}{res}          4        0.35       87.76
{txt}        253 {c |}{res}          4        0.35       88.11
{txt}        254 {c |}{res}          4        0.35       88.46
{txt}        255 {c |}{res}          4        0.35       88.81
{txt}        256 {c |}{res}          4        0.35       89.16
{txt}        257 {c |}{res}          4        0.35       89.51
{txt}        258 {c |}{res}          4        0.35       89.86
{txt}        259 {c |}{res}          4        0.35       90.21
{txt}        260 {c |}{res}          4        0.35       90.56
{txt}        261 {c |}{res}          4        0.35       90.91
{txt}        262 {c |}{res}          4        0.35       91.26
{txt}        263 {c |}{res}          4        0.35       91.61
{txt}        264 {c |}{res}          4        0.35       91.96
{txt}        265 {c |}{res}          4        0.35       92.31
{txt}        266 {c |}{res}          4        0.35       92.66
{txt}        267 {c |}{res}          4        0.35       93.01
{txt}        268 {c |}{res}          4        0.35       93.36
{txt}        269 {c |}{res}          4        0.35       93.71
{txt}        270 {c |}{res}          4        0.35       94.06
{txt}        271 {c |}{res}          4        0.35       94.41
{txt}        272 {c |}{res}          4        0.35       94.76
{txt}        273 {c |}{res}          4        0.35       95.10
{txt}        274 {c |}{res}          4        0.35       95.45
{txt}        275 {c |}{res}          4        0.35       95.80
{txt}        276 {c |}{res}          4        0.35       96.15
{txt}        277 {c |}{res}          4        0.35       96.50
{txt}        278 {c |}{res}          4        0.35       96.85
{txt}        279 {c |}{res}          4        0.35       97.20
{txt}        280 {c |}{res}          4        0.35       97.55
{txt}        281 {c |}{res}          4        0.35       97.90
{txt}        282 {c |}{res}          4        0.35       98.25
{txt}        283 {c |}{res}          4        0.35       98.60
{txt}        284 {c |}{res}          4        0.35       98.95
{txt}        285 {c |}{res}          4        0.35       99.30
{txt}        286 {c |}{res}          4        0.35       99.65
{txt}        287 {c |}{res}          4        0.35      100.00
{txt}{hline 12}{c +}{hline 35}
      Total {c |}{res}      1,144      100.00
{txt}
{com}. 
. 
. ** Check theoretic bounds of gamma
. foreach y in dem rep incumb {c -(}
{txt}  2{com}.         foreach x in capacity count {c -(}
{txt}  3{com}.                 regress `y'votesmajorpercent d_sy* d_dist* inter cum_`x'_turbine, vce(cluster district_fixed) 
{txt}  4{com}.         {c )-}
{txt}  5{com}. {c )-}
{txt}note: d_sy16 omitted because of collinearity
note: d_sy20 omitted because of collinearity
note: d_sy32 omitted because of collinearity
note: d_sy56 omitted because of collinearity
note: d_sy60 omitted because of collinearity
note: d_dist8 omitted because of collinearity
note: d_dist18 omitted because of collinearity
note: d_dist65 omitted because of collinearity
note: d_dist69 omitted because of collinearity
note: d_dist77 omitted because of collinearity
note: d_dist92 omitted because of collinearity
note: d_dist105 omitted because of collinearity
note: d_dist117 omitted because of collinearity
note: d_dist132 omitted because of collinearity
note: d_dist143 omitted because of collinearity
note: d_dist150 omitted because of collinearity
note: d_dist167 omitted because of collinearity
note: d_dist198 omitted because of collinearity
note: d_dist210 omitted because of collinearity
note: d_dist220 omitted because of collinearity
note: d_dist234 omitted because of collinearity
note: d_dist239 omitted because of collinearity
note: d_dist244 omitted because of collinearity
note: d_dist262 omitted because of collinearity
note: d_dist278 omitted because of collinearity
note: d_dist280 omitted because of collinearity

Linear regression                               Number of obs     = {res}     1,144
                                                {txt}{help j_robustsingular:F(69, 286) }       =  {res}        .
                                                {txt}Prob > F          = {res}         .
                                                {txt}R-squared         = {res}    0.8881
                                                {txt}Root MSE          =    {res}  8.965

{txt}{ralign 86:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}demvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 15}d_sy1 {c |}{col 22}{res}{space 2}-28.90805{col 34}{space 2} 6.026313{col 45}{space 1}   -4.80{col 54}{space 3}0.000{col 62}{space 4} -40.7696{col 75}{space 3}-17.04649
{txt}{space 15}d_sy2 {c |}{col 22}{res}{space 2}-21.17593{col 34}{space 2}  3.89005{col 45}{space 1}   -5.44{col 54}{space 3}0.000{col 62}{space 4}-28.83269{col 75}{space 3}-13.51918
{txt}{space 15}d_sy3 {c |}{col 22}{res}{space 2}-15.99007{col 34}{space 2} 2.933066{col 45}{space 1}   -5.45{col 54}{space 3}0.000{col 62}{space 4}-21.76321{col 75}{space 3}-10.21694
{txt}{space 15}d_sy4 {c |}{col 22}{res}{space 2}-25.32923{col 34}{space 2} 3.290872{col 45}{space 1}   -7.70{col 54}{space 3}0.000{col 62}{space 4}-31.80663{col 75}{space 3}-18.85183
{txt}{space 15}d_sy5 {c |}{col 22}{res}{space 2}-11.05237{col 34}{space 2} 4.786816{col 45}{space 1}   -2.31{col 54}{space 3}0.022{col 62}{space 4}-20.47423{col 75}{space 3}-1.630509
{txt}{space 15}d_sy6 {c |}{col 22}{res}{space 2}-10.78704{col 34}{space 2} 4.571665{col 45}{space 1}   -2.36{col 54}{space 3}0.019{col 62}{space 4}-19.78542{col 75}{space 3}-1.788667
{txt}{space 15}d_sy7 {c |}{col 22}{res}{space 2}-8.511517{col 34}{space 2} 3.442317{col 45}{space 1}   -2.47{col 54}{space 3}0.014{col 62}{space 4}-15.28701{col 75}{space 3}-1.736028
{txt}{space 15}d_sy8 {c |}{col 22}{res}{space 2}-19.05748{col 34}{space 2} 2.954194{col 45}{space 1}   -6.45{col 54}{space 3}0.000{col 62}{space 4} -24.8722{col 75}{space 3}-13.24276
{txt}{space 15}d_sy9 {c |}{col 22}{res}{space 2}-29.06933{col 34}{space 2} 4.312959{col 45}{space 1}   -6.74{col 54}{space 3}0.000{col 62}{space 4} -37.5585{col 75}{space 3}-20.58017
{txt}{space 14}d_sy10 {c |}{col 22}{res}{space 2}-23.04645{col 34}{space 2} 3.613894{col 45}{space 1}   -6.38{col 54}{space 3}0.000{col 62}{space 4}-30.15965{col 75}{space 3}-15.93325
{txt}{space 14}d_sy11 {c |}{col 22}{res}{space 2}-29.69483{col 34}{space 2} 3.129634{col 45}{space 1}   -9.49{col 54}{space 3}0.000{col 62}{space 4}-35.85486{col 75}{space 3}-23.53479
{txt}{space 14}d_sy12 {c |}{col 22}{res}{space 2}-41.27196{col 34}{space 2} 3.050655{col 45}{space 1}  -13.53{col 54}{space 3}0.000{col 62}{space 4}-47.27655{col 75}{space 3}-35.26738
{txt}{space 14}d_sy13 {c |}{col 22}{res}{space 2}-3.469988{col 34}{space 2} 3.955721{col 45}{space 1}   -0.88{col 54}{space 3}0.381{col 62}{space 4}-11.25601{col 75}{space 3}  4.31603
{txt}{space 14}d_sy14 {c |}{col 22}{res}{space 2}-5.101495{col 34}{space 2} 3.187285{col 45}{space 1}   -1.60{col 54}{space 3}0.111{col 62}{space 4}-11.37501{col 75}{space 3} 1.172017
{txt}{space 14}d_sy15 {c |}{col 22}{res}{space 2} 6.291366{col 34}{space 2} 1.697067{col 45}{space 1}    3.71{col 54}{space 3}0.000{col 62}{space 4}  2.95104{col 75}{space 3} 9.631692
{txt}{space 14}d_sy16 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 14}d_sy17 {c |}{col 22}{res}{space 2}  3.37105{col 34}{space 2} 9.418489{col 45}{space 1}    0.36{col 54}{space 3}0.721{col 62}{space 4} -15.1673{col 75}{space 3}  21.9094
{txt}{space 14}d_sy18 {c |}{col 22}{res}{space 2} 12.10173{col 34}{space 2} 4.576989{col 45}{space 1}    2.64{col 54}{space 3}0.009{col 62}{space 4} 3.092868{col 75}{space 3} 21.11058
{txt}{space 14}d_sy19 {c |}{col 22}{res}{space 2} 7.540381{col 34}{space 2} 1.421748{col 45}{space 1}    5.30{col 54}{space 3}0.000{col 62}{space 4} 4.741964{col 75}{space 3}  10.3388
{txt}{space 14}d_sy20 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 14}d_sy21 {c |}{col 22}{res}{space 2} 6.608302{col 34}{space 2} 4.200036{col 45}{space 1}    1.57{col 54}{space 3}0.117{col 62}{space 4}  -1.6586{col 75}{space 3}  14.8752
{txt}{space 14}d_sy22 {c |}{col 22}{res}{space 2} 6.800236{col 34}{space 2} 2.837784{col 45}{space 1}    2.40{col 54}{space 3}0.017{col 62}{space 4} 1.214644{col 75}{space 3} 12.38583
{txt}{space 14}d_sy23 {c |}{col 22}{res}{space 2} 6.672205{col 34}{space 2} 3.347303{col 45}{space 1}    1.99{col 54}{space 3}0.047{col 62}{space 4} .0837314{col 75}{space 3} 13.26068
{txt}{space 14}d_sy24 {c |}{col 22}{res}{space 2}-6.299058{col 34}{space 2} 1.419067{col 45}{space 1}   -4.44{col 54}{space 3}0.000{col 62}{space 4}-9.092198{col 75}{space 3}-3.505919
{txt}{space 14}d_sy25 {c |}{col 22}{res}{space 2} -6.95297{col 34}{space 2} 4.070394{col 45}{space 1}   -1.71{col 54}{space 3}0.089{col 62}{space 4} -14.9647{col 75}{space 3} 1.058759
{txt}{space 14}d_sy26 {c |}{col 22}{res}{space 2}-2.976023{col 34}{space 2} 2.816952{col 45}{space 1}   -1.06{col 54}{space 3}0.292{col 62}{space 4} -8.52061{col 75}{space 3} 2.568564
{txt}{space 14}d_sy27 {c |}{col 22}{res}{space 2}-2.874492{col 34}{space 2} 1.911678{col 45}{space 1}   -1.50{col 54}{space 3}0.134{col 62}{space 4}-6.637236{col 75}{space 3} .8882514
{txt}{space 14}d_sy28 {c |}{col 22}{res}{space 2}-18.34355{col 34}{space 2} 2.108033{col 45}{space 1}   -8.70{col 54}{space 3}0.000{col 62}{space 4}-22.49278{col 75}{space 3}-14.19433
{txt}{space 14}d_sy29 {c |}{col 22}{res}{space 2} 13.79361{col 34}{space 2} 8.924507{col 45}{space 1}    1.55{col 54}{space 3}0.123{col 62}{space 4}-3.772438{col 75}{space 3} 31.35966
{txt}{space 14}d_sy30 {c |}{col 22}{res}{space 2} 19.39867{col 34}{space 2} 7.745467{col 45}{space 1}    2.50{col 54}{space 3}0.013{col 62}{space 4} 4.153324{col 75}{space 3} 34.64402
{txt}{space 14}d_sy31 {c |}{col 22}{res}{space 2}  9.64571{col 34}{space 2} 6.790773{col 45}{space 1}    1.42{col 54}{space 3}0.157{col 62}{space 4}-3.720522{col 75}{space 3} 23.01194
{txt}{space 14}d_sy32 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 14}d_sy33 {c |}{col 22}{res}{space 2}-37.89828{col 34}{space 2} 3.845148{col 45}{space 1}   -9.86{col 54}{space 3}0.000{col 62}{space 4}-45.46666{col 75}{space 3} -30.3299
{txt}{space 14}d_sy34 {c |}{col 22}{res}{space 2} -30.7976{col 34}{space 2} 4.591108{col 45}{space 1}   -6.71{col 54}{space 3}0.000{col 62}{space 4}-39.83425{col 75}{space 3}-21.76096
{txt}{space 14}d_sy35 {c |}{col 22}{res}{space 2}-34.42567{col 34}{space 2} 2.296674{col 45}{space 1}  -14.99{col 54}{space 3}0.000{col 62}{space 4} -38.9462{col 75}{space 3}-29.90515
{txt}{space 14}d_sy36 {c |}{col 22}{res}{space 2}-43.07324{col 34}{space 2} 2.055448{col 45}{space 1}  -20.96{col 54}{space 3}0.000{col 62}{space 4}-47.11897{col 75}{space 3}-39.02752
{txt}{space 14}d_sy37 {c |}{col 22}{res}{space 2} 15.44222{col 34}{space 2} 6.386462{col 45}{space 1}    2.42{col 54}{space 3}0.016{col 62}{space 4} 2.871795{col 75}{space 3} 28.01265
{txt}{space 14}d_sy38 {c |}{col 22}{res}{space 2} 19.04231{col 34}{space 2} 4.813122{col 45}{space 1}    3.96{col 54}{space 3}0.000{col 62}{space 4} 9.568676{col 75}{space 3} 28.51595
{txt}{space 14}d_sy39 {c |}{col 22}{res}{space 2} 13.57129{col 34}{space 2} 5.039382{col 45}{space 1}    2.69{col 54}{space 3}0.007{col 62}{space 4} 3.652309{col 75}{space 3} 23.49027
{txt}{space 14}d_sy40 {c |}{col 22}{res}{space 2}-14.65956{col 34}{space 2} 3.300129{col 45}{space 1}   -4.44{col 54}{space 3}0.000{col 62}{space 4}-21.15518{col 75}{space 3}-8.163936
{txt}{space 14}d_sy41 {c |}{col 22}{res}{space 2}-42.51626{col 34}{space 2}  3.79644{col 45}{space 1}  -11.20{col 54}{space 3}0.000{col 62}{space 4}-49.98876{col 75}{space 3}-35.04375
{txt}{space 14}d_sy42 {c |}{col 22}{res}{space 2}-39.19898{col 34}{space 2} 2.949891{col 45}{space 1}  -13.29{col 54}{space 3}0.000{col 62}{space 4}-45.00523{col 75}{space 3}-33.39273
{txt}{space 14}d_sy43 {c |}{col 22}{res}{space 2}-44.02762{col 34}{space 2} 1.338159{col 45}{space 1}  -32.90{col 54}{space 3}0.000{col 62}{space 4}-46.66151{col 75}{space 3}-41.39373
{txt}{space 14}d_sy44 {c |}{col 22}{res}{space 2}-55.73753{col 34}{space 2} 2.273728{col 45}{space 1}  -24.51{col 54}{space 3}0.000{col 62}{space 4}-60.21289{col 75}{space 3}-51.26216
{txt}{space 14}d_sy45 {c |}{col 22}{res}{space 2}-25.98977{col 34}{space 2} 3.907198{col 45}{space 1}   -6.65{col 54}{space 3}0.000{col 62}{space 4}-33.68028{col 75}{space 3}-18.29926
{txt}{space 14}d_sy46 {c |}{col 22}{res}{space 2}-27.44648{col 34}{space 2} 2.017533{col 45}{space 1}  -13.60{col 54}{space 3}0.000{col 62}{space 4}-31.41757{col 75}{space 3}-23.47538
{txt}{space 14}d_sy47 {c |}{col 22}{res}{space 2}-27.51393{col 34}{space 2} 1.359689{col 45}{space 1}  -20.24{col 54}{space 3}0.000{col 62}{space 4}-30.19019{col 75}{space 3}-24.83766
{txt}{space 14}d_sy48 {c |}{col 22}{res}{space 2}-40.67844{col 34}{space 2}  2.77663{col 45}{space 1}  -14.65{col 54}{space 3}0.000{col 62}{space 4}-46.14366{col 75}{space 3}-35.21322
{txt}{space 14}d_sy49 {c |}{col 22}{res}{space 2}-10.64679{col 34}{space 2}  3.81678{col 45}{space 1}   -2.79{col 54}{space 3}0.006{col 62}{space 4}-18.15933{col 75}{space 3}-3.134246
{txt}{space 14}d_sy50 {c |}{col 22}{res}{space 2}-9.578436{col 34}{space 2} 2.838218{col 45}{space 1}   -3.37{col 54}{space 3}0.001{col 62}{space 4}-15.16488{col 75}{space 3}-3.991991
{txt}{space 14}d_sy51 {c |}{col 22}{res}{space 2}-8.922419{col 34}{space 2} 3.069113{col 45}{space 1}   -2.91{col 54}{space 3}0.004{col 62}{space 4}-14.96333{col 75}{space 3}-2.881505
{txt}{space 14}d_sy52 {c |}{col 22}{res}{space 2}-25.75519{col 34}{space 2} 3.794014{col 45}{space 1}   -6.79{col 54}{space 3}0.000{col 62}{space 4}-33.22293{col 75}{space 3}-18.28746
{txt}{space 14}d_sy53 {c |}{col 22}{res}{space 2} 5.394229{col 34}{space 2} 4.767551{col 45}{space 1}    1.13{col 54}{space 3}0.259{col 62}{space 4} -3.98971{col 75}{space 3} 14.77817
{txt}{space 14}d_sy54 {c |}{col 22}{res}{space 2} 10.76838{col 34}{space 2} 4.406597{col 45}{space 1}    2.44{col 54}{space 3}0.015{col 62}{space 4} 2.094901{col 75}{space 3} 19.44185
{txt}{space 14}d_sy55 {c |}{col 22}{res}{space 2} 9.475854{col 34}{space 2} 2.216984{col 45}{space 1}    4.27{col 54}{space 3}0.000{col 62}{space 4}  5.11218{col 75}{space 3} 13.83953
{txt}{space 14}d_sy56 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 14}d_sy57 {c |}{col 22}{res}{space 2}-1.040867{col 34}{space 2} 3.450334{col 45}{space 1}   -0.30{col 54}{space 3}0.763{col 62}{space 4}-7.832136{col 75}{space 3} 5.750401
{txt}{space 14}d_sy58 {c |}{col 22}{res}{space 2} 10.86354{col 34}{space 2} 2.466923{col 45}{space 1}    4.40{col 54}{space 3}0.000{col 62}{space 4}  6.00791{col 75}{space 3} 15.71916
{txt}{space 14}d_sy59 {c |}{col 22}{res}{space 2} 11.23577{col 34}{space 2} 1.144803{col 45}{space 1}    9.81{col 54}{space 3}0.000{col 62}{space 4} 8.982464{col 75}{space 3} 13.48908
{txt}{space 14}d_sy60 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 14}d_sy61 {c |}{col 22}{res}{space 2} .0163906{col 34}{space 2} 4.375495{col 45}{space 1}    0.00{col 54}{space 3}0.997{col 62}{space 4}-8.595867{col 75}{space 3} 8.628648
{txt}{space 14}d_sy62 {c |}{col 22}{res}{space 2} 2.600141{col 34}{space 2} 3.610226{col 45}{space 1}    0.72{col 54}{space 3}0.472{col 62}{space 4}-4.505842{col 75}{space 3} 9.706124
{txt}{space 14}d_sy63 {c |}{col 22}{res}{space 2}-1.789465{col 34}{space 2} 2.365822{col 45}{space 1}   -0.76{col 54}{space 3}0.450{col 62}{space 4}-6.446097{col 75}{space 3} 2.867167
{txt}{space 14}d_sy64 {c |}{col 22}{res}{space 2}-11.68907{col 34}{space 2} 1.853342{col 45}{space 1}   -6.31{col 54}{space 3}0.000{col 62}{space 4}-15.33699{col 75}{space 3}-8.041152
{txt}{space 14}d_sy65 {c |}{col 22}{res}{space 2}-30.76296{col 34}{space 2} 3.711947{col 45}{space 1}   -8.29{col 54}{space 3}0.000{col 62}{space 4}-38.06916{col 75}{space 3}-23.45676
{txt}{space 14}d_sy66 {c |}{col 22}{res}{space 2}-24.04619{col 34}{space 2} 2.910725{col 45}{space 1}   -8.26{col 54}{space 3}0.000{col 62}{space 4}-29.77535{col 75}{space 3}-18.31703
{txt}{space 14}d_sy67 {c |}{col 22}{res}{space 2}-29.29786{col 34}{space 2} 1.926949{col 45}{space 1}  -15.20{col 54}{space 3}0.000{col 62}{space 4}-33.09066{col 75}{space 3}-25.50506
{txt}{space 14}d_sy68 {c |}{col 22}{res}{space 2}-38.91056{col 34}{space 2} 2.311652{col 45}{space 1}  -16.83{col 54}{space 3}0.000{col 62}{space 4}-43.46057{col 75}{space 3}-34.36055
{txt}{space 14}d_sy69 {c |}{col 22}{res}{space 2}-38.13706{col 34}{space 2} 4.302546{col 45}{space 1}   -8.86{col 54}{space 3}0.000{col 62}{space 4}-46.60573{col 75}{space 3}-29.66839
{txt}{space 14}d_sy70 {c |}{col 22}{res}{space 2}-34.41185{col 34}{space 2} 3.991703{col 45}{space 1}   -8.62{col 54}{space 3}0.000{col 62}{space 4}-42.26869{col 75}{space 3}-26.55501
{txt}{space 14}d_sy71 {c |}{col 22}{res}{space 2}-36.16664{col 34}{space 2} 2.627178{col 45}{space 1}  -13.77{col 54}{space 3}0.000{col 62}{space 4}-41.33769{col 75}{space 3}-30.99558
{txt}{space 14}d_sy72 {c |}{col 22}{res}{space 2}-47.19914{col 34}{space 2} 2.313496{col 45}{space 1}  -20.40{col 54}{space 3}0.000{col 62}{space 4}-51.75278{col 75}{space 3} -42.6455
{txt}{space 14}d_sy73 {c |}{col 22}{res}{space 2} 1.003982{col 34}{space 2} 6.292719{col 45}{space 1}    0.16{col 54}{space 3}0.873{col 62}{space 4}-11.38193{col 75}{space 3}  13.3899
{txt}{space 14}d_sy74 {c |}{col 22}{res}{space 2} 1.208502{col 34}{space 2}  3.24633{col 45}{space 1}    0.37{col 54}{space 3}0.710{col 62}{space 4}-5.181228{col 75}{space 3} 7.598232
{txt}{space 14}d_sy75 {c |}{col 22}{res}{space 2}-1.945823{col 34}{space 2} 2.155331{col 45}{space 1}   -0.90{col 54}{space 3}0.367{col 62}{space 4}-6.188146{col 75}{space 3} 2.296501
{txt}{space 14}d_sy76 {c |}{col 22}{res}{space 2}-13.15113{col 34}{space 2} 1.422295{col 45}{space 1}   -9.25{col 54}{space 3}0.000{col 62}{space 4}-15.95062{col 75}{space 3}-10.35164
{txt}{space 14}d_sy77 {c |}{col 22}{res}{space 2}-5.886122{col 34}{space 2} 6.990543{col 45}{space 1}   -0.84{col 54}{space 3}0.400{col 62}{space 4}-19.64556{col 75}{space 3} 7.873317
{txt}{space 14}d_sy78 {c |}{col 22}{res}{space 2} 5.133645{col 34}{space 2} 4.801952{col 45}{space 1}    1.07{col 54}{space 3}0.286{col 62}{space 4}-4.318004{col 75}{space 3} 14.58529
{txt}{space 14}d_sy79 {c |}{col 22}{res}{space 2}-1.810816{col 34}{space 2} 3.235689{col 45}{space 1}   -0.56{col 54}{space 3}0.576{col 62}{space 4}-8.179601{col 75}{space 3} 4.557969
{txt}{space 14}d_sy80 {c |}{col 22}{res}{space 2}-21.65659{col 34}{space 2} 5.342285{col 45}{space 1}   -4.05{col 54}{space 3}0.000{col 62}{space 4}-32.17177{col 75}{space 3}-11.14141
{txt}{space 14}d_sy81 {c |}{col 22}{res}{space 2}-49.20148{col 34}{space 2}  6.11573{col 45}{space 1}   -8.05{col 54}{space 3}0.000{col 62}{space 4}-61.23903{col 75}{space 3}-37.16393
{txt}{space 14}d_sy82 {c |}{col 22}{res}{space 2}-49.59234{col 34}{space 2} 5.288247{col 45}{space 1}   -9.38{col 54}{space 3}0.000{col 62}{space 4}-60.00116{col 75}{space 3}-39.18351
{txt}{space 14}d_sy83 {c |}{col 22}{res}{space 2}-38.10795{col 34}{space 2} 8.001057{col 45}{space 1}   -4.76{col 54}{space 3}0.000{col 62}{space 4}-53.85638{col 75}{space 3}-22.35952
{txt}{space 14}d_sy84 {c |}{col 22}{res}{space 2} -61.3878{col 34}{space 2} 4.736801{col 45}{space 1}  -12.96{col 54}{space 3}0.000{col 62}{space 4}-70.71121{col 75}{space 3}-52.06438
{txt}{space 14}d_sy85 {c |}{col 22}{res}{space 2} 17.24421{col 34}{space 2} 6.278699{col 45}{space 1}    2.75{col 54}{space 3}0.006{col 62}{space 4} 4.885893{col 75}{space 3} 29.60254
{txt}{space 14}d_sy86 {c |}{col 22}{res}{space 2} 23.28742{col 34}{space 2} 3.626068{col 45}{space 1}    6.42{col 54}{space 3}0.000{col 62}{space 4} 16.15025{col 75}{space 3} 30.42458
{txt}{space 14}d_sy87 {c |}{col 22}{res}{space 2} 19.71633{col 34}{space 2} 3.185246{col 45}{space 1}    6.19{col 54}{space 3}0.000{col 62}{space 4} 13.44683{col 75}{space 3} 25.98583
{txt}{space 14}d_sy88 {c |}{col 22}{res}{space 2} 9.877353{col 34}{space 2} 2.520397{col 45}{space 1}    3.92{col 54}{space 3}0.000{col 62}{space 4} 4.916474{col 75}{space 3} 14.83823
{txt}{space 14}d_sy89 {c |}{col 22}{res}{space 2}-45.19603{col 34}{space 2} 4.921232{col 45}{space 1}   -9.18{col 54}{space 3}0.000{col 62}{space 4}-54.88246{col 75}{space 3}-35.50961
{txt}{space 14}d_sy90 {c |}{col 22}{res}{space 2}-40.41602{col 34}{space 2} 3.820453{col 45}{space 1}  -10.58{col 54}{space 3}0.000{col 62}{space 4}-47.93579{col 75}{space 3}-32.89624
{txt}{space 14}d_sy91 {c |}{col 22}{res}{space 2}-36.14266{col 34}{space 2} 5.608991{col 45}{space 1}   -6.44{col 54}{space 3}0.000{col 62}{space 4} -47.1828{col 75}{space 3}-25.10252
{txt}{space 14}d_sy92 {c |}{col 22}{res}{space 2}-60.28487{col 34}{space 2} 5.381588{col 45}{space 1}  -11.20{col 54}{space 3}0.000{col 62}{space 4}-70.87741{col 75}{space 3}-49.69232
{txt}{space 14}d_sy93 {c |}{col 22}{res}{space 2}-21.03806{col 34}{space 2} 3.768574{col 45}{space 1}   -5.58{col 54}{space 3}0.000{col 62}{space 4}-28.45571{col 75}{space 3} -13.6204
{txt}{space 14}d_sy94 {c |}{col 22}{res}{space 2}-22.02001{col 34}{space 2} 2.580427{col 45}{space 1}   -8.53{col 54}{space 3}0.000{col 62}{space 4}-27.09905{col 75}{space 3}-16.94098
{txt}{space 14}d_sy95 {c |}{col 22}{res}{space 2}-26.81165{col 34}{space 2} 1.708007{col 45}{space 1}  -15.70{col 54}{space 3}0.000{col 62}{space 4}-30.17351{col 75}{space 3}-23.44979
{txt}{space 14}d_sy96 {c |}{col 22}{res}{space 2}-34.54576{col 34}{space 2} 2.942956{col 45}{space 1}  -11.74{col 54}{space 3}0.000{col 62}{space 4}-40.33836{col 75}{space 3}-28.75316
{txt}{space 14}d_sy97 {c |}{col 22}{res}{space 2}-33.46078{col 34}{space 2} 7.359835{col 45}{space 1}   -4.55{col 54}{space 3}0.000{col 62}{space 4}-47.94709{col 75}{space 3}-18.97447
{txt}{space 14}d_sy98 {c |}{col 22}{res}{space 2}-39.75832{col 34}{space 2} 4.816411{col 45}{space 1}   -8.25{col 54}{space 3}0.000{col 62}{space 4}-49.23843{col 75}{space 3}-30.27821
{txt}{space 14}d_sy99 {c |}{col 22}{res}{space 2}-38.52602{col 34}{space 2} 5.579963{col 45}{space 1}   -6.90{col 54}{space 3}0.000{col 62}{space 4}-49.50903{col 75}{space 3}-27.54302
{txt}{space 13}d_sy100 {c |}{col 22}{res}{space 2}-48.35991{col 34}{space 2} 3.230895{col 45}{space 1}  -14.97{col 54}{space 3}0.000{col 62}{space 4}-54.71926{col 75}{space 3}-42.00056
{txt}{space 13}d_dist1 {c |}{col 22}{res}{space 2}-2.895095{col 34}{space 2} .1146206{col 45}{space 1}  -25.26{col 54}{space 3}0.000{col 62}{space 4}-3.120702{col 75}{space 3}-2.669488
{txt}{space 13}d_dist2 {c |}{col 22}{res}{space 2}-12.53357{col 34}{space 2} .0468536{col 45}{space 1} -267.50{col 54}{space 3}0.000{col 62}{space 4} -12.6258{col 75}{space 3}-12.44135
{txt}{space 13}d_dist3 {c |}{col 22}{res}{space 2}-17.62553{col 34}{space 2} .3612299{col 45}{space 1}  -48.79{col 54}{space 3}0.000{col 62}{space 4}-18.33654{col 75}{space 3}-16.91452
{txt}{space 13}d_dist4 {c |}{col 22}{res}{space 2} 25.29965{col 34}{space 2} .6188492{col 45}{space 1}   40.88{col 54}{space 3}0.000{col 62}{space 4} 24.08157{col 75}{space 3} 26.51773
{txt}{space 13}d_dist5 {c |}{col 22}{res}{space 2}-1.819289{col 34}{space 2} .2185993{col 45}{space 1}   -8.32{col 54}{space 3}0.000{col 62}{space 4}-2.249557{col 75}{space 3}-1.389022
{txt}{space 13}d_dist6 {c |}{col 22}{res}{space 2}-33.52371{col 34}{space 2} .0525662{col 45}{space 1} -637.74{col 54}{space 3}0.000{col 62}{space 4}-33.62717{col 75}{space 3}-33.42024
{txt}{space 13}d_dist7 {c |}{col 22}{res}{space 2} 12.44248{col 34}{space 2} .3718608{col 45}{space 1}   33.46{col 54}{space 3}0.000{col 62}{space 4} 11.71055{col 75}{space 3} 13.17441
{txt}{space 13}d_dist8 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 13}d_dist9 {c |}{col 22}{res}{space 2} 10.24106{col 34}{space 2} 2.646135{col 45}{space 1}    3.87{col 54}{space 3}0.000{col 62}{space 4} 5.032686{col 75}{space 3} 15.44943
{txt}{space 12}d_dist10 {c |}{col 22}{res}{space 2}-22.53721{col 34}{space 2} 2.569848{col 45}{space 1}   -8.77{col 54}{space 3}0.000{col 62}{space 4}-27.59543{col 75}{space 3}  -17.479
{txt}{space 12}d_dist11 {c |}{col 22}{res}{space 2}-18.51681{col 34}{space 2} 2.653039{col 45}{space 1}   -6.98{col 54}{space 3}0.000{col 62}{space 4}-23.73877{col 75}{space 3}-13.29485
{txt}{space 12}d_dist12 {c |}{col 22}{res}{space 2}-18.63904{col 34}{space 2} 2.646623{col 45}{space 1}   -7.04{col 54}{space 3}0.000{col 62}{space 4}-23.84837{col 75}{space 3}-13.42971
{txt}{space 12}d_dist13 {c |}{col 22}{res}{space 2} 15.62547{col 34}{space 2}  2.64661{col 45}{space 1}    5.90{col 54}{space 3}0.000{col 62}{space 4} 10.41616{col 75}{space 3} 20.83477
{txt}{space 12}d_dist14 {c |}{col 22}{res}{space 2} 11.67866{col 34}{space 2} 2.656812{col 45}{space 1}    4.40{col 54}{space 3}0.000{col 62}{space 4} 6.449276{col 75}{space 3} 16.90805
{txt}{space 12}d_dist15 {c |}{col 22}{res}{space 2} 18.57599{col 34}{space 2} 2.746743{col 45}{space 1}    6.76{col 54}{space 3}0.000{col 62}{space 4}  13.1696{col 75}{space 3} 23.98239
{txt}{space 12}d_dist16 {c |}{col 22}{res}{space 2} 25.34594{col 34}{space 2} 2.744284{col 45}{space 1}    9.24{col 54}{space 3}0.000{col 62}{space 4} 19.94438{col 75}{space 3} 30.74749
{txt}{space 12}d_dist17 {c |}{col 22}{res}{space 2} 29.19509{col 34}{space 2} 2.662467{col 45}{space 1}   10.97{col 54}{space 3}0.000{col 62}{space 4} 23.95457{col 75}{space 3}  34.4356
{txt}{space 12}d_dist18 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 12}d_dist19 {c |}{col 22}{res}{space 2}-10.94878{col 34}{space 2} 2.301623{col 45}{space 1}   -4.76{col 54}{space 3}0.000{col 62}{space 4}-15.47905{col 75}{space 3}-6.418513
{txt}{space 12}d_dist20 {c |}{col 22}{res}{space 2} 16.48701{col 34}{space 2} 2.680195{col 45}{space 1}    6.15{col 54}{space 3}0.000{col 62}{space 4}  11.2116{col 75}{space 3} 21.76242
{txt}{space 12}d_dist21 {c |}{col 22}{res}{space 2} 14.92488{col 34}{space 2} 2.654851{col 45}{space 1}    5.62{col 54}{space 3}0.000{col 62}{space 4} 9.699358{col 75}{space 3} 20.15041
{txt}{space 12}d_dist22 {c |}{col 22}{res}{space 2} 13.72407{col 34}{space 2}  2.65057{col 45}{space 1}    5.18{col 54}{space 3}0.000{col 62}{space 4} 8.506974{col 75}{space 3} 18.94117
{txt}{space 12}d_dist23 {c |}{col 22}{res}{space 2} 12.54093{col 34}{space 2} 2.673398{col 45}{space 1}    4.69{col 54}{space 3}0.000{col 62}{space 4} 7.278897{col 75}{space 3} 17.80296
{txt}{space 12}d_dist24 {c |}{col 22}{res}{space 2} 14.18593{col 34}{space 2} 2.673398{col 45}{space 1}    5.31{col 54}{space 3}0.000{col 62}{space 4} 8.923896{col 75}{space 3} 19.44796
{txt}{space 12}d_dist25 {c |}{col 22}{res}{space 2} 12.56021{col 34}{space 2} 2.648546{col 45}{space 1}    4.74{col 54}{space 3}0.000{col 62}{space 4} 7.347099{col 75}{space 3} 17.77333
{txt}{space 12}d_dist26 {c |}{col 22}{res}{space 2} 12.80088{col 34}{space 2}  2.59424{col 45}{space 1}    4.93{col 54}{space 3}0.000{col 62}{space 4}  7.69466{col 75}{space 3} 17.90711
{txt}{space 12}d_dist27 {c |}{col 22}{res}{space 2}-33.51251{col 34}{space 2} 2.664177{col 45}{space 1}  -12.58{col 54}{space 3}0.000{col 62}{space 4}-38.75639{col 75}{space 3}-28.26863
{txt}{space 12}d_dist28 {c |}{col 22}{res}{space 2} 10.46931{col 34}{space 2} 2.669319{col 45}{space 1}    3.92{col 54}{space 3}0.000{col 62}{space 4} 5.215303{col 75}{space 3} 15.72331
{txt}{space 12}d_dist29 {c |}{col 22}{res}{space 2}-37.37096{col 34}{space 2} 2.653281{col 45}{space 1}  -14.08{col 54}{space 3}0.000{col 62}{space 4}-42.59339{col 75}{space 3}-32.14852
{txt}{space 12}d_dist30 {c |}{col 22}{res}{space 2}-54.85936{col 34}{space 2} 2.089623{col 45}{space 1}  -26.25{col 54}{space 3}0.000{col 62}{space 4}-58.97235{col 75}{space 3}-50.74636
{txt}{space 12}d_dist31 {c |}{col 22}{res}{space 2} 2.084388{col 34}{space 2} 2.867993{col 45}{space 1}    0.73{col 54}{space 3}0.468{col 62}{space 4}-3.560663{col 75}{space 3} 7.729439
{txt}{space 12}d_dist32 {c |}{col 22}{res}{space 2}-22.34574{col 34}{space 2} 2.680213{col 45}{space 1}   -8.34{col 54}{space 3}0.000{col 62}{space 4}-27.62118{col 75}{space 3}-17.07029
{txt}{space 12}d_dist33 {c |}{col 22}{res}{space 2}-23.41761{col 34}{space 2} 2.739645{col 45}{space 1}   -8.55{col 54}{space 3}0.000{col 62}{space 4}-28.81004{col 75}{space 3}-18.02519
{txt}{space 12}d_dist34 {c |}{col 22}{res}{space 2}-19.40845{col 34}{space 2}  2.71124{col 45}{space 1}   -7.16{col 54}{space 3}0.000{col 62}{space 4}-24.74497{col 75}{space 3}-14.07194
{txt}{space 12}d_dist35 {c |}{col 22}{res}{space 2} 5.783951{col 34}{space 2} 2.832458{col 45}{space 1}    2.04{col 54}{space 3}0.042{col 62}{space 4} .2088426{col 75}{space 3} 11.35906
{txt}{space 12}d_dist36 {c |}{col 22}{res}{space 2} 22.48732{col 34}{space 2} 2.645961{col 45}{space 1}    8.50{col 54}{space 3}0.000{col 62}{space 4} 17.27929{col 75}{space 3} 27.69535
{txt}{space 12}d_dist37 {c |}{col 22}{res}{space 2} 9.777318{col 34}{space 2} 2.666679{col 45}{space 1}    3.67{col 54}{space 3}0.000{col 62}{space 4} 4.528511{col 75}{space 3} 15.02613
{txt}{space 12}d_dist38 {c |}{col 22}{res}{space 2} 14.48311{col 34}{space 2} 3.021721{col 45}{space 1}    4.79{col 54}{space 3}0.000{col 62}{space 4}  8.53548{col 75}{space 3} 20.43075
{txt}{space 12}d_dist39 {c |}{col 22}{res}{space 2} 31.68343{col 34}{space 2} 2.673398{col 45}{space 1}   11.85{col 54}{space 3}0.000{col 62}{space 4}  26.4214{col 75}{space 3} 36.94546
{txt}{space 12}d_dist40 {c |}{col 22}{res}{space 2} 33.41812{col 34}{space 2} 2.672233{col 45}{space 1}   12.51{col 54}{space 3}0.000{col 62}{space 4} 28.15838{col 75}{space 3} 38.67785
{txt}{space 12}d_dist41 {c |}{col 22}{res}{space 2}  9.08843{col 34}{space 2} 2.673398{col 45}{space 1}    3.40{col 54}{space 3}0.001{col 62}{space 4} 3.826398{col 75}{space 3} 14.35046
{txt}{space 12}d_dist42 {c |}{col 22}{res}{space 2} 17.07843{col 34}{space 2} 2.673398{col 45}{space 1}    6.39{col 54}{space 3}0.000{col 62}{space 4}  11.8164{col 75}{space 3} 22.34046
{txt}{space 12}d_dist43 {c |}{col 22}{res}{space 2} 28.10843{col 34}{space 2} 2.673398{col 45}{space 1}   10.51{col 54}{space 3}0.000{col 62}{space 4}  22.8464{col 75}{space 3} 33.37046
{txt}{space 12}d_dist44 {c |}{col 22}{res}{space 2}  6.18521{col 34}{space 2} 2.656863{col 45}{space 1}    2.33{col 54}{space 3}0.021{col 62}{space 4} .9557243{col 75}{space 3}  11.4147
{txt}{space 12}d_dist45 {c |}{col 22}{res}{space 2} 29.03593{col 34}{space 2} 2.673398{col 45}{space 1}   10.86{col 54}{space 3}0.000{col 62}{space 4}  23.7739{col 75}{space 3} 34.29796
{txt}{space 12}d_dist46 {c |}{col 22}{res}{space 2} 27.78018{col 34}{space 2}  2.66772{col 45}{space 1}   10.41{col 54}{space 3}0.000{col 62}{space 4} 22.52932{col 75}{space 3} 33.03103
{txt}{space 12}d_dist47 {c |}{col 22}{res}{space 2}  6.23593{col 34}{space 2} 2.673398{col 45}{space 1}    2.33{col 54}{space 3}0.020{col 62}{space 4}  .973898{col 75}{space 3} 11.49796
{txt}{space 12}d_dist48 {c |}{col 22}{res}{space 2}-26.12139{col 34}{space 2} 2.654993{col 45}{space 1}   -9.84{col 54}{space 3}0.000{col 62}{space 4} -31.3472{col 75}{space 3}-20.89559
{txt}{space 12}d_dist49 {c |}{col 22}{res}{space 2}-35.80788{col 34}{space 2} 2.418344{col 45}{space 1}  -14.81{col 54}{space 3}0.000{col 62}{space 4}-40.56789{col 75}{space 3}-31.04787
{txt}{space 12}d_dist50 {c |}{col 22}{res}{space 2} -35.1248{col 34}{space 2} 2.719957{col 45}{space 1}  -12.91{col 54}{space 3}0.000{col 62}{space 4}-40.47848{col 75}{space 3}-29.77113
{txt}{space 12}d_dist51 {c |}{col 22}{res}{space 2} 2.674351{col 34}{space 2} 3.112439{col 45}{space 1}    0.86{col 54}{space 3}0.391{col 62}{space 4} -3.45184{col 75}{space 3} 8.800543
{txt}{space 12}d_dist52 {c |}{col 22}{res}{space 2}-18.87201{col 34}{space 2} 2.661183{col 45}{space 1}   -7.09{col 54}{space 3}0.000{col 62}{space 4}   -24.11{col 75}{space 3}-13.63402
{txt}{space 12}d_dist53 {c |}{col 22}{res}{space 2}-22.65544{col 34}{space 2} 2.379041{col 45}{space 1}   -9.52{col 54}{space 3}0.000{col 62}{space 4}-27.33809{col 75}{space 3}-17.97279
{txt}{space 12}d_dist54 {c |}{col 22}{res}{space 2}-21.15624{col 34}{space 2} 2.646619{col 45}{space 1}   -7.99{col 54}{space 3}0.000{col 62}{space 4}-26.36556{col 75}{space 3}-15.94692
{txt}{space 12}d_dist55 {c |}{col 22}{res}{space 2}  4.01343{col 34}{space 2} 2.673398{col 45}{space 1}    1.50{col 54}{space 3}0.134{col 62}{space 4}-1.248602{col 75}{space 3} 9.275463
{txt}{space 12}d_dist56 {c |}{col 22}{res}{space 2}-21.96169{col 34}{space 2} 2.650081{col 45}{space 1}   -8.29{col 54}{space 3}0.000{col 62}{space 4}-27.17783{col 75}{space 3}-16.74556
{txt}{space 12}d_dist57 {c |}{col 22}{res}{space 2}-24.78817{col 34}{space 2} 2.651187{col 45}{space 1}   -9.35{col 54}{space 3}0.000{col 62}{space 4}-30.00649{col 75}{space 3}-19.56986
{txt}{space 12}d_dist58 {c |}{col 22}{res}{space 2}-16.43407{col 34}{space 2} 2.673398{col 45}{space 1}   -6.15{col 54}{space 3}0.000{col 62}{space 4} -21.6961{col 75}{space 3}-11.17204
{txt}{space 12}d_dist59 {c |}{col 22}{res}{space 2} 5.476489{col 34}{space 2} 2.717167{col 45}{space 1}    2.02{col 54}{space 3}0.045{col 62}{space 4} .1283067{col 75}{space 3} 10.82467
{txt}{space 12}d_dist60 {c |}{col 22}{res}{space 2}-28.22994{col 34}{space 2} 2.679121{col 45}{space 1}  -10.54{col 54}{space 3}0.000{col 62}{space 4}-33.50323{col 75}{space 3}-22.95664
{txt}{space 12}d_dist61 {c |}{col 22}{res}{space 2} 9.295027{col 34}{space 2} 2.666261{col 45}{space 1}    3.49{col 54}{space 3}0.001{col 62}{space 4} 4.047043{col 75}{space 3} 14.54301
{txt}{space 12}d_dist62 {c |}{col 22}{res}{space 2} 38.44815{col 34}{space 2} 2.619773{col 45}{space 1}   14.68{col 54}{space 3}0.000{col 62}{space 4} 33.29167{col 75}{space 3} 43.60463
{txt}{space 12}d_dist63 {c |}{col 22}{res}{space 2} 23.63294{col 34}{space 2}  2.42041{col 45}{space 1}    9.76{col 54}{space 3}0.000{col 62}{space 4} 18.86886{col 75}{space 3} 28.39702
{txt}{space 12}d_dist64 {c |}{col 22}{res}{space 2} 13.75728{col 34}{space 2} 2.457285{col 45}{space 1}    5.60{col 54}{space 3}0.000{col 62}{space 4}  8.92062{col 75}{space 3} 18.59393
{txt}{space 12}d_dist65 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 12}d_dist66 {c |}{col 22}{res}{space 2}-9.084751{col 34}{space 2} 2.289169{col 45}{space 1}   -3.97{col 54}{space 3}0.000{col 62}{space 4}-13.59051{col 75}{space 3}-4.578995
{txt}{space 12}d_dist67 {c |}{col 22}{res}{space 2}-6.584625{col 34}{space 2} 2.198859{col 45}{space 1}   -2.99{col 54}{space 3}0.003{col 62}{space 4}-10.91262{col 75}{space 3}-2.256625
{txt}{space 12}d_dist68 {c |}{col 22}{res}{space 2} 11.60688{col 34}{space 2} 2.278578{col 45}{space 1}    5.09{col 54}{space 3}0.000{col 62}{space 4} 7.121974{col 75}{space 3} 16.09179
{txt}{space 12}d_dist69 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 12}d_dist70 {c |}{col 22}{res}{space 2}-3.914888{col 34}{space 2} .1822094{col 45}{space 1}  -21.49{col 54}{space 3}0.000{col 62}{space 4} -4.27353{col 75}{space 3}-3.556246
{txt}{space 12}d_dist71 {c |}{col 22}{res}{space 2}-35.52742{col 34}{space 2} 2.982768{col 45}{space 1}  -11.91{col 54}{space 3}0.000{col 62}{space 4}-41.39838{col 75}{space 3}-29.65646
{txt}{space 12}d_dist72 {c |}{col 22}{res}{space 2}-50.04809{col 34}{space 2}  3.02743{col 45}{space 1}  -16.53{col 54}{space 3}0.000{col 62}{space 4}-56.00696{col 75}{space 3}-44.08922
{txt}{space 12}d_dist73 {c |}{col 22}{res}{space 2} 7.018904{col 34}{space 2} .8071568{col 45}{space 1}    8.70{col 54}{space 3}0.000{col 62}{space 4} 5.430183{col 75}{space 3} 8.607626
{txt}{space 12}d_dist74 {c |}{col 22}{res}{space 2} 13.10341{col 34}{space 2} .8075129{col 45}{space 1}   16.23{col 54}{space 3}0.000{col 62}{space 4} 11.51399{col 75}{space 3} 14.69283
{txt}{space 12}d_dist75 {c |}{col 22}{res}{space 2}-1.789088{col 34}{space 2} .8075129{col 45}{space 1}   -2.22{col 54}{space 3}0.028{col 62}{space 4} -3.37851{col 75}{space 3}-.1996656
{txt}{space 12}d_dist76 {c |}{col 22}{res}{space 2} 8.685911{col 34}{space 2} .8075129{col 45}{space 1}   10.76{col 54}{space 3}0.000{col 62}{space 4} 7.096488{col 75}{space 3} 10.27533
{txt}{space 12}d_dist77 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 12}d_dist78 {c |}{col 22}{res}{space 2}-34.75423{col 34}{space 2} .8076276{col 45}{space 1}  -43.03{col 54}{space 3}0.000{col 62}{space 4}-36.34387{col 75}{space 3}-33.16458
{txt}{space 12}d_dist79 {c |}{col 22}{res}{space 2} 7.715702{col 34}{space 2} .8072397{col 45}{space 1}    9.56{col 54}{space 3}0.000{col 62}{space 4} 6.126817{col 75}{space 3} 9.304586
{txt}{space 12}d_dist80 {c |}{col 22}{res}{space 2}-24.65655{col 34}{space 2} .9448958{col 45}{space 1}  -26.09{col 54}{space 3}0.000{col 62}{space 4}-26.51638{col 75}{space 3}-22.79672
{txt}{space 12}d_dist81 {c |}{col 22}{res}{space 2}-3.886309{col 34}{space 2} .8126651{col 45}{space 1}   -4.78{col 54}{space 3}0.000{col 62}{space 4}-5.485873{col 75}{space 3}-2.286746
{txt}{space 12}d_dist82 {c |}{col 22}{res}{space 2}-33.27047{col 34}{space 2} .8272454{col 45}{space 1}  -40.22{col 54}{space 3}0.000{col 62}{space 4}-34.89873{col 75}{space 3}-31.64221
{txt}{space 12}d_dist83 {c |}{col 22}{res}{space 2}-31.18436{col 34}{space 2} 1.127715{col 45}{space 1}  -27.65{col 54}{space 3}0.000{col 62}{space 4}-33.40403{col 75}{space 3}-28.96469
{txt}{space 12}d_dist84 {c |}{col 22}{res}{space 2} -.799762{col 34}{space 2} .8078189{col 45}{space 1}   -0.99{col 54}{space 3}0.323{col 62}{space 4}-2.389787{col 75}{space 3} .7902625
{txt}{space 12}d_dist85 {c |}{col 22}{res}{space 2}-38.25015{col 34}{space 2}  .808239{col 45}{space 1}  -47.33{col 54}{space 3}0.000{col 62}{space 4}  -39.841{col 75}{space 3} -36.6593
{txt}{space 12}d_dist86 {c |}{col 22}{res}{space 2}-34.81508{col 34}{space 2} .9397116{col 45}{space 1}  -37.05{col 54}{space 3}0.000{col 62}{space 4}-36.66471{col 75}{space 3}-32.96545
{txt}{space 12}d_dist87 {c |}{col 22}{res}{space 2}-40.93494{col 34}{space 2} 1.182012{col 45}{space 1}  -34.63{col 54}{space 3}0.000{col 62}{space 4}-43.26148{col 75}{space 3}-38.60839
{txt}{space 12}d_dist88 {c |}{col 22}{res}{space 2}-44.90787{col 34}{space 2} .8722908{col 45}{space 1}  -51.48{col 54}{space 3}0.000{col 62}{space 4}-46.62479{col 75}{space 3}-43.19094
{txt}{space 12}d_dist89 {c |}{col 22}{res}{space 2}-12.72404{col 34}{space 2} .8957066{col 45}{space 1}  -14.21{col 54}{space 3}0.000{col 62}{space 4}-14.48705{col 75}{space 3}-10.96103
{txt}{space 12}d_dist90 {c |}{col 22}{res}{space 2}-46.55644{col 34}{space 2} .9407411{col 45}{space 1}  -49.49{col 54}{space 3}0.000{col 62}{space 4} -48.4081{col 75}{space 3}-44.70479
{txt}{space 12}d_dist91 {c |}{col 22}{res}{space 2}-44.61296{col 34}{space 2} .8141518{col 45}{space 1}  -54.80{col 54}{space 3}0.000{col 62}{space 4}-46.21545{col 75}{space 3}-43.01047
{txt}{space 12}d_dist92 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 12}d_dist93 {c |}{col 22}{res}{space 2}-12.57799{col 34}{space 2} .7620016{col 45}{space 1}  -16.51{col 54}{space 3}0.000{col 62}{space 4}-14.07783{col 75}{space 3}-11.07815
{txt}{space 12}d_dist94 {c |}{col 22}{res}{space 2}-29.18425{col 34}{space 2} .7833505{col 45}{space 1}  -37.26{col 54}{space 3}0.000{col 62}{space 4}-30.72611{col 75}{space 3}-27.64238
{txt}{space 12}d_dist95 {c |}{col 22}{res}{space 2}-33.80483{col 34}{space 2} .3655982{col 45}{space 1}  -92.46{col 54}{space 3}0.000{col 62}{space 4}-34.52444{col 75}{space 3}-33.08523
{txt}{space 12}d_dist96 {c |}{col 22}{res}{space 2} -36.7632{col 34}{space 2} .7816619{col 45}{space 1}  -47.03{col 54}{space 3}0.000{col 62}{space 4}-38.30174{col 75}{space 3}-35.22466
{txt}{space 12}d_dist97 {c |}{col 22}{res}{space 2} -33.0371{col 34}{space 2} .7657736{col 45}{space 1}  -43.14{col 54}{space 3}0.000{col 62}{space 4}-34.54436{col 75}{space 3}-31.52983
{txt}{space 12}d_dist98 {c |}{col 22}{res}{space 2}-7.499494{col 34}{space 2} .7824808{col 45}{space 1}   -9.58{col 54}{space 3}0.000{col 62}{space 4}-9.039645{col 75}{space 3}-5.959342
{txt}{space 12}d_dist99 {c |}{col 22}{res}{space 2}-13.07023{col 34}{space 2} .9009989{col 45}{space 1}  -14.51{col 54}{space 3}0.000{col 62}{space 4}-14.84366{col 75}{space 3} -11.2968
{txt}{space 11}d_dist100 {c |}{col 22}{res}{space 2}-12.75678{col 34}{space 2} 1.325783{col 45}{space 1}   -9.62{col 54}{space 3}0.000{col 62}{space 4}-15.36631{col 75}{space 3}-10.14725
{txt}{space 11}d_dist101 {c |}{col 22}{res}{space 2}-77.01004{col 34}{space 2}  5.94542{col 45}{space 1}  -12.95{col 54}{space 3}0.000{col 62}{space 4}-88.71237{col 75}{space 3}-65.30771
{txt}{space 11}d_dist102 {c |}{col 22}{res}{space 2}-42.27689{col 34}{space 2} 5.145488{col 45}{space 1}   -8.22{col 54}{space 3}0.000{col 62}{space 4}-52.40472{col 75}{space 3}-32.14906
{txt}{space 11}d_dist103 {c |}{col 22}{res}{space 2} -30.0705{col 34}{space 2}  4.96214{col 45}{space 1}   -6.06{col 54}{space 3}0.000{col 62}{space 4}-39.83745{col 75}{space 3}-20.30355
{txt}{space 11}d_dist104 {c |}{col 22}{res}{space 2}-53.12128{col 34}{space 2} 5.368943{col 45}{space 1}   -9.89{col 54}{space 3}0.000{col 62}{space 4}-63.68893{col 75}{space 3}-42.55362
{txt}{space 11}d_dist105 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist106 {c |}{col 22}{res}{space 2} 32.90014{col 34}{space 2} .3442188{col 45}{space 1}   95.58{col 54}{space 3}0.000{col 62}{space 4} 32.22262{col 75}{space 3} 33.57767
{txt}{space 11}d_dist107 {c |}{col 22}{res}{space 2} 29.72462{col 34}{space 2} .5541653{col 45}{space 1}   53.64{col 54}{space 3}0.000{col 62}{space 4} 28.63386{col 75}{space 3} 30.81538
{txt}{space 11}d_dist108 {c |}{col 22}{res}{space 2}  46.3365{col 34}{space 2} .4741918{col 45}{space 1}   97.72{col 54}{space 3}0.000{col 62}{space 4} 45.40316{col 75}{space 3} 47.26985
{txt}{space 11}d_dist109 {c |}{col 22}{res}{space 2} 41.85631{col 34}{space 2} .7166247{col 45}{space 1}   58.41{col 54}{space 3}0.000{col 62}{space 4} 40.44578{col 75}{space 3} 43.26684
{txt}{space 11}d_dist110 {c |}{col 22}{res}{space 2}-.7104166{col 34}{space 2}  .212697{col 45}{space 1}   -3.34{col 54}{space 3}0.001{col 62}{space 4}-1.129067{col 75}{space 3}-.2917667
{txt}{space 11}d_dist111 {c |}{col 22}{res}{space 2} 46.69671{col 34}{space 2} .4061523{col 45}{space 1}  114.97{col 54}{space 3}0.000{col 62}{space 4} 45.89729{col 75}{space 3} 47.49614
{txt}{space 11}d_dist112 {c |}{col 22}{res}{space 2} 39.24295{col 34}{space 2} .1734378{col 45}{space 1}  226.27{col 54}{space 3}0.000{col 62}{space 4} 38.90157{col 75}{space 3} 39.58432
{txt}{space 11}d_dist113 {c |}{col 22}{res}{space 2} 2.941279{col 34}{space 2} .0957484{col 45}{space 1}   30.72{col 54}{space 3}0.000{col 62}{space 4} 2.752818{col 75}{space 3}  3.12974
{txt}{space 11}d_dist114 {c |}{col 22}{res}{space 2} 8.169542{col 34}{space 2} .1318001{col 45}{space 1}   61.98{col 54}{space 3}0.000{col 62}{space 4} 7.910121{col 75}{space 3} 8.428963
{txt}{space 11}d_dist115 {c |}{col 22}{res}{space 2} .3155268{col 34}{space 2} .5476913{col 45}{space 1}    0.58{col 54}{space 3}0.565{col 62}{space 4}-.7624904{col 75}{space 3} 1.393544
{txt}{space 11}d_dist116 {c |}{col 22}{res}{space 2} .0235195{col 34}{space 2} .5376989{col 45}{space 1}    0.04{col 54}{space 3}0.965{col 62}{space 4} -1.03483{col 75}{space 3} 1.081869
{txt}{space 11}d_dist117 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist118 {c |}{col 22}{res}{space 2} -16.1544{col 34}{space 2} .9416959{col 45}{space 1}  -17.15{col 54}{space 3}0.000{col 62}{space 4}-18.00793{col 75}{space 3}-14.30086
{txt}{space 11}d_dist119 {c |}{col 22}{res}{space 2} -2.27272{col 34}{space 2} .5555287{col 45}{space 1}   -4.09{col 54}{space 3}0.000{col 62}{space 4}-3.366163{col 75}{space 3}-1.179276
{txt}{space 11}d_dist120 {c |}{col 22}{res}{space 2} 18.54747{col 34}{space 2} .2594194{col 45}{space 1}   71.50{col 54}{space 3}0.000{col 62}{space 4} 18.03686{col 75}{space 3} 19.05808
{txt}{space 11}d_dist121 {c |}{col 22}{res}{space 2} 5.426974{col 34}{space 2} .6178992{col 45}{space 1}    8.78{col 54}{space 3}0.000{col 62}{space 4} 4.210768{col 75}{space 3} 6.643181
{txt}{space 11}d_dist122 {c |}{col 22}{res}{space 2}-13.62123{col 34}{space 2} 2.069569{col 45}{space 1}   -6.58{col 54}{space 3}0.000{col 62}{space 4}-17.69475{col 75}{space 3}-9.547707
{txt}{space 11}d_dist123 {c |}{col 22}{res}{space 2} 33.62076{col 34}{space 2} .5594846{col 45}{space 1}   60.09{col 54}{space 3}0.000{col 62}{space 4} 32.51953{col 75}{space 3} 34.72199
{txt}{space 11}d_dist124 {c |}{col 22}{res}{space 2} 3.717159{col 34}{space 2} .4256043{col 45}{space 1}    8.73{col 54}{space 3}0.000{col 62}{space 4} 2.879445{col 75}{space 3} 4.554873
{txt}{space 11}d_dist125 {c |}{col 22}{res}{space 2}  6.61172{col 34}{space 2} .3215454{col 45}{space 1}   20.56{col 54}{space 3}0.000{col 62}{space 4} 5.978824{col 75}{space 3} 7.244615
{txt}{space 11}d_dist126 {c |}{col 22}{res}{space 2} 6.295181{col 34}{space 2} .3119853{col 45}{space 1}   20.18{col 54}{space 3}0.000{col 62}{space 4} 5.681102{col 75}{space 3}  6.90926
{txt}{space 11}d_dist127 {c |}{col 22}{res}{space 2} 37.77342{col 34}{space 2} .1944314{col 45}{space 1}  194.28{col 54}{space 3}0.000{col 62}{space 4} 37.39072{col 75}{space 3} 38.15612
{txt}{space 11}d_dist128 {c |}{col 22}{res}{space 2} 7.314315{col 34}{space 2} .2500109{col 45}{space 1}   29.26{col 54}{space 3}0.000{col 62}{space 4}  6.82222{col 75}{space 3}  7.80641
{txt}{space 11}d_dist129 {c |}{col 22}{res}{space 2} 17.18111{col 34}{space 2} .3231839{col 45}{space 1}   53.16{col 54}{space 3}0.000{col 62}{space 4} 16.54499{col 75}{space 3} 17.81723
{txt}{space 11}d_dist130 {c |}{col 22}{res}{space 2} 10.33266{col 34}{space 2} .3026637{col 45}{space 1}   34.14{col 54}{space 3}0.000{col 62}{space 4} 9.736925{col 75}{space 3} 10.92839
{txt}{space 11}d_dist131 {c |}{col 22}{res}{space 2} 19.76643{col 34}{space 2} .4670822{col 45}{space 1}   42.32{col 54}{space 3}0.000{col 62}{space 4} 18.84708{col 75}{space 3} 20.68579
{txt}{space 11}d_dist132 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist133 {c |}{col 22}{res}{space 2} 14.39393{col 34}{space 2} .4670822{col 45}{space 1}   30.82{col 54}{space 3}0.000{col 62}{space 4} 13.47458{col 75}{space 3} 15.31329
{txt}{space 11}d_dist134 {c |}{col 22}{res}{space 2} 41.80893{col 34}{space 2} .4670822{col 45}{space 1}   89.51{col 54}{space 3}0.000{col 62}{space 4} 40.88958{col 75}{space 3} 42.72829
{txt}{space 11}d_dist135 {c |}{col 22}{res}{space 2} 56.60811{col 34}{space 2} .4384418{col 45}{space 1}  129.11{col 54}{space 3}0.000{col 62}{space 4} 55.74512{col 75}{space 3} 57.47109
{txt}{space 11}d_dist136 {c |}{col 22}{res}{space 2} 58.94893{col 34}{space 2} .4670822{col 45}{space 1}  126.21{col 54}{space 3}0.000{col 62}{space 4} 58.02958{col 75}{space 3} 59.86829
{txt}{space 11}d_dist137 {c |}{col 22}{res}{space 2} 47.33508{col 34}{space 2} .3543092{col 45}{space 1}  133.60{col 54}{space 3}0.000{col 62}{space 4}  46.6377{col 75}{space 3} 48.03247
{txt}{space 11}d_dist138 {c |}{col 22}{res}{space 2} 1.800226{col 34}{space 2} 3.236712{col 45}{space 1}    0.56{col 54}{space 3}0.579{col 62}{space 4}-4.570573{col 75}{space 3} 8.171024
{txt}{space 11}d_dist139 {c |}{col 22}{res}{space 2}-5.075897{col 34}{space 2} .0360216{col 45}{space 1} -140.91{col 54}{space 3}0.000{col 62}{space 4}-5.146798{col 75}{space 3}-5.004996
{txt}{space 11}d_dist140 {c |}{col 22}{res}{space 2}-6.011029{col 34}{space 2} .5267836{col 45}{space 1}  -11.41{col 54}{space 3}0.000{col 62}{space 4}-7.047894{col 75}{space 3}-4.974165
{txt}{space 11}d_dist141 {c |}{col 22}{res}{space 2} 22.48744{col 34}{space 2}  .960008{col 45}{space 1}   23.42{col 54}{space 3}0.000{col 62}{space 4} 20.59786{col 75}{space 3} 24.37702
{txt}{space 11}d_dist142 {c |}{col 22}{res}{space 2} 31.42962{col 34}{space 2} 1.442595{col 45}{space 1}   21.79{col 54}{space 3}0.000{col 62}{space 4} 28.59017{col 75}{space 3} 34.26907
{txt}{space 11}d_dist143 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist144 {c |}{col 22}{res}{space 2} 19.25483{col 34}{space 2} .8481129{col 45}{space 1}   22.70{col 54}{space 3}0.000{col 62}{space 4}  17.5855{col 75}{space 3} 20.92417
{txt}{space 11}d_dist145 {c |}{col 22}{res}{space 2}  18.5483{col 34}{space 2} 1.007113{col 45}{space 1}   18.42{col 54}{space 3}0.000{col 62}{space 4} 16.56601{col 75}{space 3}  20.5306
{txt}{space 11}d_dist146 {c |}{col 22}{res}{space 2} 21.60794{col 34}{space 2}  .184981{col 45}{space 1}  116.81{col 54}{space 3}0.000{col 62}{space 4} 21.24384{col 75}{space 3} 21.97203
{txt}{space 11}d_dist147 {c |}{col 22}{res}{space 2}-25.21565{col 34}{space 2} .4939852{col 45}{space 1}  -51.05{col 54}{space 3}0.000{col 62}{space 4}-26.18796{col 75}{space 3}-24.24334
{txt}{space 11}d_dist148 {c |}{col 22}{res}{space 2} 1.839962{col 34}{space 2} .9850881{col 45}{space 1}    1.87{col 54}{space 3}0.063{col 62}{space 4}-.0989807{col 75}{space 3} 3.778904
{txt}{space 11}d_dist149 {c |}{col 22}{res}{space 2} 2.800531{col 34}{space 2} .4079148{col 45}{space 1}    6.87{col 54}{space 3}0.000{col 62}{space 4} 1.997635{col 75}{space 3} 3.603427
{txt}{space 11}d_dist150 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist151 {c |}{col 22}{res}{space 2}-25.95159{col 34}{space 2} .4973481{col 45}{space 1}  -52.18{col 54}{space 3}0.000{col 62}{space 4}-26.93052{col 75}{space 3}-24.97266
{txt}{space 11}d_dist152 {c |}{col 22}{res}{space 2}-29.22448{col 34}{space 2}  .454103{col 45}{space 1}  -64.36{col 54}{space 3}0.000{col 62}{space 4}-30.11829{col 75}{space 3}-28.33068
{txt}{space 11}d_dist153 {c |}{col 22}{res}{space 2}-30.78976{col 34}{space 2} .9228542{col 45}{space 1}  -33.36{col 54}{space 3}0.000{col 62}{space 4}-32.60621{col 75}{space 3}-28.97331
{txt}{space 11}d_dist154 {c |}{col 22}{res}{space 2}-29.40645{col 34}{space 2} .5432753{col 45}{space 1}  -54.13{col 54}{space 3}0.000{col 62}{space 4}-30.47577{col 75}{space 3}-28.33712
{txt}{space 11}d_dist155 {c |}{col 22}{res}{space 2} -11.8604{col 34}{space 2} 1.499139{col 45}{space 1}   -7.91{col 54}{space 3}0.000{col 62}{space 4}-14.81114{col 75}{space 3}-8.909651
{txt}{space 11}d_dist156 {c |}{col 22}{res}{space 2}-40.68565{col 34}{space 2} 1.486459{col 45}{space 1}  -27.37{col 54}{space 3}0.000{col 62}{space 4}-43.61143{col 75}{space 3}-37.75986
{txt}{space 11}d_dist157 {c |}{col 22}{res}{space 2}-31.87018{col 34}{space 2} 1.427238{col 45}{space 1}  -22.33{col 54}{space 3}0.000{col 62}{space 4} -34.6794{col 75}{space 3}-29.06096
{txt}{space 11}d_dist158 {c |}{col 22}{res}{space 2} -31.8021{col 34}{space 2} .7529541{col 45}{space 1}  -42.24{col 54}{space 3}0.000{col 62}{space 4}-33.28414{col 75}{space 3}-30.32007
{txt}{space 11}d_dist159 {c |}{col 22}{res}{space 2}-28.46852{col 34}{space 2} .6129866{col 45}{space 1}  -46.44{col 54}{space 3}0.000{col 62}{space 4}-29.67506{col 75}{space 3}-27.26198
{txt}{space 11}d_dist160 {c |}{col 22}{res}{space 2} 7.802366{col 34}{space 2} .5682583{col 45}{space 1}   13.73{col 54}{space 3}0.000{col 62}{space 4} 6.683867{col 75}{space 3} 8.920865
{txt}{space 11}d_dist161 {c |}{col 22}{res}{space 2}-35.11569{col 34}{space 2} .5849328{col 45}{space 1}  -60.03{col 54}{space 3}0.000{col 62}{space 4}-36.26701{col 75}{space 3}-33.96437
{txt}{space 11}d_dist162 {c |}{col 22}{res}{space 2}-26.41454{col 34}{space 2} .6592187{col 45}{space 1}  -40.07{col 54}{space 3}0.000{col 62}{space 4}-27.71207{col 75}{space 3}  -25.117
{txt}{space 11}d_dist163 {c |}{col 22}{res}{space 2}-38.46496{col 34}{space 2} .5046586{col 45}{space 1}  -76.22{col 54}{space 3}0.000{col 62}{space 4}-39.45827{col 75}{space 3}-37.47164
{txt}{space 11}d_dist164 {c |}{col 22}{res}{space 2}-28.79594{col 34}{space 2} .0801202{col 45}{space 1} -359.41{col 54}{space 3}0.000{col 62}{space 4}-28.95364{col 75}{space 3}-28.63824
{txt}{space 11}d_dist165 {c |}{col 22}{res}{space 2}-5.623542{col 34}{space 2} .7650073{col 45}{space 1}   -7.35{col 54}{space 3}0.000{col 62}{space 4}-7.129301{col 75}{space 3}-4.117784
{txt}{space 11}d_dist166 {c |}{col 22}{res}{space 2}-24.98276{col 34}{space 2} .0590165{col 45}{space 1} -423.32{col 54}{space 3}0.000{col 62}{space 4}-25.09892{col 75}{space 3}-24.86659
{txt}{space 11}d_dist167 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist168 {c |}{col 22}{res}{space 2}-1.779214{col 34}{space 2} .0204254{col 45}{space 1}  -87.11{col 54}{space 3}0.000{col 62}{space 4}-1.819417{col 75}{space 3}-1.739011
{txt}{space 11}d_dist169 {c |}{col 22}{res}{space 2} 26.36756{col 34}{space 2} .4850186{col 45}{space 1}   54.36{col 54}{space 3}0.000{col 62}{space 4}  25.4129{col 75}{space 3} 27.32222
{txt}{space 11}d_dist170 {c |}{col 22}{res}{space 2}-35.12061{col 34}{space 2} .0441654{col 45}{space 1} -795.21{col 54}{space 3}0.000{col 62}{space 4}-35.20754{col 75}{space 3}-35.03368
{txt}{space 11}d_dist171 {c |}{col 22}{res}{space 2}-9.364435{col 34}{space 2} .4074091{col 45}{space 1}  -22.99{col 54}{space 3}0.000{col 62}{space 4}-10.16634{col 75}{space 3}-8.562534
{txt}{space 11}d_dist172 {c |}{col 22}{res}{space 2} 7.193343{col 34}{space 2} .6140021{col 45}{space 1}   11.72{col 54}{space 3}0.000{col 62}{space 4} 5.984807{col 75}{space 3} 8.401879
{txt}{space 11}d_dist173 {c |}{col 22}{res}{space 2} 11.83315{col 34}{space 2} .9614517{col 45}{space 1}   12.31{col 54}{space 3}0.000{col 62}{space 4} 9.940734{col 75}{space 3} 13.72557
{txt}{space 11}d_dist174 {c |}{col 22}{res}{space 2} 21.37973{col 34}{space 2} .6389971{col 45}{space 1}   33.46{col 54}{space 3}0.000{col 62}{space 4}   20.122{col 75}{space 3} 22.63746
{txt}{space 11}d_dist175 {c |}{col 22}{res}{space 2}-7.448164{col 34}{space 2} .6256716{col 45}{space 1}  -11.90{col 54}{space 3}0.000{col 62}{space 4}-8.679669{col 75}{space 3}-6.216659
{txt}{space 11}d_dist176 {c |}{col 22}{res}{space 2} 17.92489{col 34}{space 2} .5929254{col 45}{space 1}   30.23{col 54}{space 3}0.000{col 62}{space 4} 16.75784{col 75}{space 3} 19.09195
{txt}{space 11}d_dist177 {c |}{col 22}{res}{space 2} 33.96267{col 34}{space 2} .6002663{col 45}{space 1}   56.58{col 54}{space 3}0.000{col 62}{space 4} 32.78117{col 75}{space 3} 35.14417
{txt}{space 11}d_dist178 {c |}{col 22}{res}{space 2} 53.82364{col 34}{space 2}   .58929{col 45}{space 1}   91.34{col 54}{space 3}0.000{col 62}{space 4} 52.66375{col 75}{space 3} 54.98354
{txt}{space 11}d_dist179 {c |}{col 22}{res}{space 2} 41.48386{col 34}{space 2} 1.081902{col 45}{space 1}   38.34{col 54}{space 3}0.000{col 62}{space 4} 39.35436{col 75}{space 3} 43.61336
{txt}{space 11}d_dist180 {c |}{col 22}{res}{space 2}  38.2426{col 34}{space 2} .7010082{col 45}{space 1}   54.55{col 54}{space 3}0.000{col 62}{space 4} 36.86281{col 75}{space 3} 39.62239
{txt}{space 11}d_dist181 {c |}{col 22}{res}{space 2} 39.90453{col 34}{space 2} .5888735{col 45}{space 1}   67.76{col 54}{space 3}0.000{col 62}{space 4} 38.74546{col 75}{space 3} 41.06361
{txt}{space 11}d_dist182 {c |}{col 22}{res}{space 2} 51.04644{col 34}{space 2} .7353345{col 45}{space 1}   69.42{col 54}{space 3}0.000{col 62}{space 4} 49.59909{col 75}{space 3} 52.49379
{txt}{space 11}d_dist183 {c |}{col 22}{res}{space 2} 50.87598{col 34}{space 2} .5866514{col 45}{space 1}   86.72{col 54}{space 3}0.000{col 62}{space 4} 49.72128{col 75}{space 3} 52.03068
{txt}{space 11}d_dist184 {c |}{col 22}{res}{space 2} 49.29249{col 34}{space 2} .7644241{col 45}{space 1}   64.48{col 54}{space 3}0.000{col 62}{space 4} 47.78788{col 75}{space 3}  50.7971
{txt}{space 11}d_dist185 {c |}{col 22}{res}{space 2} 7.270565{col 34}{space 2} .8180418{col 45}{space 1}    8.89{col 54}{space 3}0.000{col 62}{space 4} 5.660419{col 75}{space 3} 8.880712
{txt}{space 11}d_dist186 {c |}{col 22}{res}{space 2} 39.92822{col 34}{space 2} 1.227781{col 45}{space 1}   32.52{col 54}{space 3}0.000{col 62}{space 4} 37.51159{col 75}{space 3} 42.34486
{txt}{space 11}d_dist187 {c |}{col 22}{res}{space 2} 50.92322{col 34}{space 2} 1.227781{col 45}{space 1}   41.48{col 54}{space 3}0.000{col 62}{space 4} 48.50659{col 75}{space 3} 53.33985
{txt}{space 11}d_dist188 {c |}{col 22}{res}{space 2} 54.78822{col 34}{space 2} 1.227781{col 45}{space 1}   44.62{col 54}{space 3}0.000{col 62}{space 4} 52.37159{col 75}{space 3} 57.20485
{txt}{space 11}d_dist189 {c |}{col 22}{res}{space 2} 36.27251{col 34}{space 2} 1.092077{col 45}{space 1}   33.21{col 54}{space 3}0.000{col 62}{space 4} 34.12299{col 75}{space 3} 38.42204
{txt}{space 11}d_dist190 {c |}{col 22}{res}{space 2}  26.1745{col 34}{space 2} .9630671{col 45}{space 1}   27.18{col 54}{space 3}0.000{col 62}{space 4} 24.27891{col 75}{space 3}  28.0701
{txt}{space 11}d_dist191 {c |}{col 22}{res}{space 2} 5.765394{col 34}{space 2} .8745723{col 45}{space 1}    6.59{col 54}{space 3}0.000{col 62}{space 4} 4.043979{col 75}{space 3} 7.486809
{txt}{space 11}d_dist192 {c |}{col 22}{res}{space 2} 2.849307{col 34}{space 2} .9035027{col 45}{space 1}    3.15{col 54}{space 3}0.002{col 62}{space 4} 1.070949{col 75}{space 3} 4.627666
{txt}{space 11}d_dist193 {c |}{col 22}{res}{space 2}  25.4245{col 34}{space 2} .6547894{col 45}{space 1}   38.83{col 54}{space 3}0.000{col 62}{space 4} 24.13569{col 75}{space 3} 26.71332
{txt}{space 11}d_dist194 {c |}{col 22}{res}{space 2} 30.16517{col 34}{space 2} 1.039104{col 45}{space 1}   29.03{col 54}{space 3}0.000{col 62}{space 4} 28.11991{col 75}{space 3} 32.21044
{txt}{space 11}d_dist195 {c |}{col 22}{res}{space 2}-6.396156{col 34}{space 2} 1.542554{col 45}{space 1}   -4.15{col 54}{space 3}0.000{col 62}{space 4}-9.432355{col 75}{space 3}-3.359957
{txt}{space 11}d_dist196 {c |}{col 22}{res}{space 2} 5.743807{col 34}{space 2} .8500851{col 45}{space 1}    6.76{col 54}{space 3}0.000{col 62}{space 4} 4.070591{col 75}{space 3} 7.417024
{txt}{space 11}d_dist197 {c |}{col 22}{res}{space 2}-4.071642{col 34}{space 2} .5975006{col 45}{space 1}   -6.81{col 54}{space 3}0.000{col 62}{space 4}-5.247698{col 75}{space 3}-2.895585
{txt}{space 11}d_dist198 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist199 {c |}{col 22}{res}{space 2} 23.23628{col 34}{space 2} .6155416{col 45}{space 1}   37.75{col 54}{space 3}0.000{col 62}{space 4} 22.02471{col 75}{space 3} 24.44785
{txt}{space 11}d_dist200 {c |}{col 22}{res}{space 2} 27.98349{col 34}{space 2} .8786477{col 45}{space 1}   31.85{col 54}{space 3}0.000{col 62}{space 4} 26.25405{col 75}{space 3} 29.71292
{txt}{space 11}d_dist201 {c |}{col 22}{res}{space 2} 4.349986{col 34}{space 2} .7145642{col 45}{space 1}    6.09{col 54}{space 3}0.000{col 62}{space 4} 2.943514{col 75}{space 3} 5.756458
{txt}{space 11}d_dist202 {c |}{col 22}{res}{space 2} 40.31927{col 34}{space 2}   .17357{col 45}{space 1}  232.29{col 54}{space 3}0.000{col 62}{space 4} 39.97763{col 75}{space 3}  40.6609
{txt}{space 11}d_dist203 {c |}{col 22}{res}{space 2} 28.85948{col 34}{space 2} .0406591{col 45}{space 1}  709.79{col 54}{space 3}0.000{col 62}{space 4} 28.77945{col 75}{space 3} 28.93951
{txt}{space 11}d_dist204 {c |}{col 22}{res}{space 2}-3.958114{col 34}{space 2} .7139938{col 45}{space 1}   -5.54{col 54}{space 3}0.000{col 62}{space 4}-5.363463{col 75}{space 3}-2.552764
{txt}{space 11}d_dist205 {c |}{col 22}{res}{space 2}  29.6975{col 34}{space 2}        .{col 45}{space 1}       .{col 54}{space 3}    .{col 62}{space 4}        .{col 75}{space 3}        .
{txt}{space 11}d_dist206 {c |}{col 22}{res}{space 2} 6.880455{col 34}{space 2} .1660243{col 45}{space 1}   41.44{col 54}{space 3}0.000{col 62}{space 4} 6.553671{col 75}{space 3}  7.20724
{txt}{space 11}d_dist207 {c |}{col 22}{res}{space 2}-4.256071{col 34}{space 2} .0051141{col 45}{space 1} -832.22{col 54}{space 3}0.000{col 62}{space 4}-4.266137{col 75}{space 3}-4.246005
{txt}{space 11}d_dist208 {c |}{col 22}{res}{space 2} 34.06863{col 34}{space 2} .1669348{col 45}{space 1}  204.08{col 54}{space 3}0.000{col 62}{space 4} 33.74005{col 75}{space 3} 34.39721
{txt}{space 11}d_dist209 {c |}{col 22}{res}{space 2} 18.33437{col 34}{space 2} .0464847{col 45}{space 1}  394.42{col 54}{space 3}0.000{col 62}{space 4} 18.24288{col 75}{space 3} 18.42587
{txt}{space 11}d_dist210 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist211 {c |}{col 22}{res}{space 2} 3.343731{col 34}{space 2} .1333962{col 45}{space 1}   25.07{col 54}{space 3}0.000{col 62}{space 4} 3.081169{col 75}{space 3} 3.606294
{txt}{space 11}d_dist212 {c |}{col 22}{res}{space 2} 20.47222{col 34}{space 2} .4516857{col 45}{space 1}   45.32{col 54}{space 3}0.000{col 62}{space 4} 19.58317{col 75}{space 3} 21.36127
{txt}{space 11}d_dist213 {c |}{col 22}{res}{space 2} 34.92028{col 34}{space 2} .0114172{col 45}{space 1} 3058.57{col 54}{space 3}0.000{col 62}{space 4} 34.89781{col 75}{space 3} 34.94276
{txt}{space 11}d_dist214 {c |}{col 22}{res}{space 2} 28.26471{col 34}{space 2} .0093727{col 45}{space 1} 3015.63{col 54}{space 3}0.000{col 62}{space 4} 28.24626{col 75}{space 3} 28.28316
{txt}{space 11}d_dist215 {c |}{col 22}{res}{space 2}-21.94913{col 34}{space 2} .0492588{col 45}{space 1} -445.59{col 54}{space 3}0.000{col 62}{space 4}-22.04609{col 75}{space 3}-21.85218
{txt}{space 11}d_dist216 {c |}{col 22}{res}{space 2}-28.68833{col 34}{space 2} .0384944{col 45}{space 1} -745.26{col 54}{space 3}0.000{col 62}{space 4} -28.7641{col 75}{space 3}-28.61256
{txt}{space 11}d_dist217 {c |}{col 22}{res}{space 2}-33.21732{col 34}{space 2} .6570371{col 45}{space 1}  -50.56{col 54}{space 3}0.000{col 62}{space 4}-34.51056{col 75}{space 3}-31.92408
{txt}{space 11}d_dist218 {c |}{col 22}{res}{space 2}-36.03352{col 34}{space 2} 1.288373{col 45}{space 1}  -27.97{col 54}{space 3}0.000{col 62}{space 4}-38.56942{col 75}{space 3}-33.49762
{txt}{space 11}d_dist219 {c |}{col 22}{res}{space 2}-36.43369{col 34}{space 2} 1.239177{col 45}{space 1}  -29.40{col 54}{space 3}0.000{col 62}{space 4}-38.87275{col 75}{space 3}-33.99462
{txt}{space 11}d_dist220 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist221 {c |}{col 22}{res}{space 2}-32.86868{col 34}{space 2} .7974047{col 45}{space 1}  -41.22{col 54}{space 3}0.000{col 62}{space 4} -34.4382{col 75}{space 3}-31.29915
{txt}{space 11}d_dist222 {c |}{col 22}{res}{space 2}-38.36499{col 34}{space 2} 1.086729{col 45}{space 1}  -35.30{col 54}{space 3}0.000{col 62}{space 4}-40.50399{col 75}{space 3}-36.22599
{txt}{space 11}d_dist223 {c |}{col 22}{res}{space 2}-3.036102{col 34}{space 2} 1.467142{col 45}{space 1}   -2.07{col 54}{space 3}0.039{col 62}{space 4}-5.923867{col 75}{space 3} -.148337
{txt}{space 11}d_dist224 {c |}{col 22}{res}{space 2}-9.572022{col 34}{space 2} .9167477{col 45}{space 1}  -10.44{col 54}{space 3}0.000{col 62}{space 4}-11.37645{col 75}{space 3}-7.767594
{txt}{space 11}d_dist225 {c |}{col 22}{res}{space 2} 16.98536{col 34}{space 2} 1.014515{col 45}{space 1}   16.74{col 54}{space 3}0.000{col 62}{space 4}  14.9885{col 75}{space 3} 18.98222
{txt}{space 11}d_dist226 {c |}{col 22}{res}{space 2}-28.80727{col 34}{space 2} .8013729{col 45}{space 1}  -35.95{col 54}{space 3}0.000{col 62}{space 4} -30.3846{col 75}{space 3}-27.22993
{txt}{space 11}d_dist227 {c |}{col 22}{res}{space 2}-8.028019{col 34}{space 2} .7254317{col 45}{space 1}  -11.07{col 54}{space 3}0.000{col 62}{space 4}-9.455881{col 75}{space 3}-6.600156
{txt}{space 11}d_dist228 {c |}{col 22}{res}{space 2} -33.1694{col 34}{space 2} .9197561{col 45}{space 1}  -36.06{col 54}{space 3}0.000{col 62}{space 4}-34.97975{col 75}{space 3}-31.35905
{txt}{space 11}d_dist229 {c |}{col 22}{res}{space 2}-25.12636{col 34}{space 2} 1.040013{col 45}{space 1}  -24.16{col 54}{space 3}0.000{col 62}{space 4}-27.17341{col 75}{space 3}-23.07931
{txt}{space 11}d_dist230 {c |}{col 22}{res}{space 2}-26.76481{col 34}{space 2} .7863779{col 45}{space 1}  -34.04{col 54}{space 3}0.000{col 62}{space 4}-28.31263{col 75}{space 3}-25.21698
{txt}{space 11}d_dist231 {c |}{col 22}{res}{space 2} 5.422175{col 34}{space 2} .3650896{col 45}{space 1}   14.85{col 54}{space 3}0.000{col 62}{space 4} 4.703571{col 75}{space 3} 6.140778
{txt}{space 11}d_dist232 {c |}{col 22}{res}{space 2}-19.38609{col 34}{space 2} .1506349{col 45}{space 1} -128.70{col 54}{space 3}0.000{col 62}{space 4}-19.68258{col 75}{space 3}-19.08959
{txt}{space 11}d_dist233 {c |}{col 22}{res}{space 2} -41.5339{col 34}{space 2} .6265879{col 45}{space 1}  -66.29{col 54}{space 3}0.000{col 62}{space 4}-42.76721{col 75}{space 3}-40.30059
{txt}{space 11}d_dist234 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist235 {c |}{col 22}{res}{space 2}-53.46885{col 34}{space 2} 2.509876{col 45}{space 1}  -21.30{col 54}{space 3}0.000{col 62}{space 4}-58.40902{col 75}{space 3}-48.52867
{txt}{space 11}d_dist236 {c |}{col 22}{res}{space 2}-52.39576{col 34}{space 2} .9453705{col 45}{space 1}  -55.42{col 54}{space 3}0.000{col 62}{space 4}-54.25652{col 75}{space 3}-50.53499
{txt}{space 11}d_dist237 {c |}{col 22}{res}{space 2}-31.90648{col 34}{space 2} .4406895{col 45}{space 1}  -72.40{col 54}{space 3}0.000{col 62}{space 4}-32.77388{col 75}{space 3}-31.03907
{txt}{space 11}d_dist238 {c |}{col 22}{res}{space 2} 47.07868{col 34}{space 2} 2.997341{col 45}{space 1}   15.71{col 54}{space 3}0.000{col 62}{space 4} 41.17903{col 75}{space 3} 52.97832
{txt}{space 11}d_dist239 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist240 {c |}{col 22}{res}{space 2} 51.58017{col 34}{space 2} 3.089888{col 45}{space 1}   16.69{col 54}{space 3}0.000{col 62}{space 4} 45.49836{col 75}{space 3} 57.66197
{txt}{space 11}d_dist241 {c |}{col 22}{res}{space 2} 46.49855{col 34}{space 2} 3.004029{col 45}{space 1}   15.48{col 54}{space 3}0.000{col 62}{space 4} 40.58574{col 75}{space 3} 52.41136
{txt}{space 11}d_dist242 {c |}{col 22}{res}{space 2} 31.26583{col 34}{space 2} 3.083731{col 45}{space 1}   10.14{col 54}{space 3}0.000{col 62}{space 4} 25.19614{col 75}{space 3} 37.33552
{txt}{space 11}d_dist243 {c |}{col 22}{res}{space 2} 4.614205{col 34}{space 2} .2359611{col 45}{space 1}   19.55{col 54}{space 3}0.000{col 62}{space 4} 4.149764{col 75}{space 3} 5.078646
{txt}{space 11}d_dist244 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist245 {c |}{col 22}{res}{space 2}-45.68807{col 34}{space 2} .6135008{col 45}{space 1}  -74.47{col 54}{space 3}0.000{col 62}{space 4}-46.89562{col 75}{space 3}-44.48052
{txt}{space 11}d_dist246 {c |}{col 22}{res}{space 2}-40.78897{col 34}{space 2} .1381085{col 45}{space 1} -295.34{col 54}{space 3}0.000{col 62}{space 4}-41.06081{col 75}{space 3}-40.51713
{txt}{space 11}d_dist247 {c |}{col 22}{res}{space 2}-62.49082{col 34}{space 2} .4536728{col 45}{space 1} -137.74{col 54}{space 3}0.000{col 62}{space 4}-63.38378{col 75}{space 3}-61.59786
{txt}{space 11}d_dist248 {c |}{col 22}{res}{space 2}-42.93513{col 34}{space 2} .4666294{col 45}{space 1}  -92.01{col 54}{space 3}0.000{col 62}{space 4} -43.8536{col 75}{space 3}-42.01667
{txt}{space 11}d_dist249 {c |}{col 22}{res}{space 2}-39.67751{col 34}{space 2} .3476228{col 45}{space 1} -114.14{col 54}{space 3}0.000{col 62}{space 4}-40.36174{col 75}{space 3}-38.99329
{txt}{space 11}d_dist250 {c |}{col 22}{res}{space 2}-40.27054{col 34}{space 2}  .303979{col 45}{space 1} -132.48{col 54}{space 3}0.000{col 62}{space 4}-40.86886{col 75}{space 3}-39.67222
{txt}{space 11}d_dist251 {c |}{col 22}{res}{space 2}-57.71035{col 34}{space 2} .6272387{col 45}{space 1}  -92.01{col 54}{space 3}0.000{col 62}{space 4}-58.94494{col 75}{space 3}-56.47576
{txt}{space 11}d_dist252 {c |}{col 22}{res}{space 2}-51.77434{col 34}{space 2} .3796017{col 45}{space 1} -136.39{col 54}{space 3}0.000{col 62}{space 4} -52.5215{col 75}{space 3}-51.02717
{txt}{space 11}d_dist253 {c |}{col 22}{res}{space 2}-22.77755{col 34}{space 2} .3755297{col 45}{space 1}  -60.65{col 54}{space 3}0.000{col 62}{space 4}-23.51671{col 75}{space 3} -22.0384
{txt}{space 11}d_dist254 {c |}{col 22}{res}{space 2}-23.10819{col 34}{space 2} .4516207{col 45}{space 1}  -51.17{col 54}{space 3}0.000{col 62}{space 4}-23.99711{col 75}{space 3}-22.21927
{txt}{space 11}d_dist255 {c |}{col 22}{res}{space 2}-28.67802{col 34}{space 2} .2681684{col 45}{space 1} -106.94{col 54}{space 3}0.000{col 62}{space 4}-29.20585{col 75}{space 3}-28.15018
{txt}{space 11}d_dist256 {c |}{col 22}{res}{space 2} 2.975242{col 34}{space 2} .2551148{col 45}{space 1}   11.66{col 54}{space 3}0.000{col 62}{space 4} 2.473102{col 75}{space 3} 3.477383
{txt}{space 11}d_dist257 {c |}{col 22}{res}{space 2}-47.86308{col 34}{space 2}  .368671{col 45}{space 1} -129.83{col 54}{space 3}0.000{col 62}{space 4}-48.58873{col 75}{space 3}-47.13743
{txt}{space 11}d_dist258 {c |}{col 22}{res}{space 2}-53.12493{col 34}{space 2} .8880662{col 45}{space 1}  -59.82{col 54}{space 3}0.000{col 62}{space 4}-54.87291{col 75}{space 3}-51.37696
{txt}{space 11}d_dist259 {c |}{col 22}{res}{space 2}-29.49571{col 34}{space 2} .5097834{col 45}{space 1}  -57.86{col 54}{space 3}0.000{col 62}{space 4}-30.49911{col 75}{space 3} -28.4923
{txt}{space 11}d_dist260 {c |}{col 22}{res}{space 2}-52.71321{col 34}{space 2} .2336136{col 45}{space 1} -225.64{col 54}{space 3}0.000{col 62}{space 4}-53.17303{col 75}{space 3}-52.25339
{txt}{space 11}d_dist261 {c |}{col 22}{res}{space 2}-67.81845{col 34}{space 2} .7672744{col 45}{space 1}  -88.39{col 54}{space 3}0.000{col 62}{space 4}-69.32867{col 75}{space 3}-66.30823
{txt}{space 11}d_dist262 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist263 {c |}{col 22}{res}{space 2}-6.499182{col 34}{space 2} .0500374{col 45}{space 1} -129.89{col 54}{space 3}0.000{col 62}{space 4} -6.59767{col 75}{space 3}-6.400693
{txt}{space 11}d_dist264 {c |}{col 22}{res}{space 2} 5.988509{col 34}{space 2} .1097617{col 45}{space 1}   54.56{col 54}{space 3}0.000{col 62}{space 4} 5.772466{col 75}{space 3} 6.204552
{txt}{space 11}d_dist265 {c |}{col 22}{res}{space 2} 29.62365{col 34}{space 2} .0455721{col 45}{space 1}  650.04{col 54}{space 3}0.000{col 62}{space 4} 29.53395{col 75}{space 3} 29.71335
{txt}{space 11}d_dist266 {c |}{col 22}{res}{space 2} 40.24622{col 34}{space 2}  .067547{col 45}{space 1}  595.83{col 54}{space 3}0.000{col 62}{space 4} 40.11327{col 75}{space 3} 40.37918
{txt}{space 11}d_dist267 {c |}{col 22}{res}{space 2} 39.83457{col 34}{space 2} .0459972{col 45}{space 1}  866.02{col 54}{space 3}0.000{col 62}{space 4} 39.74404{col 75}{space 3} 39.92511
{txt}{space 11}d_dist268 {c |}{col 22}{res}{space 2}-3.813778{col 34}{space 2}  .067547{col 45}{space 1}  -56.46{col 54}{space 3}0.000{col 62}{space 4} -3.94673{col 75}{space 3}-3.680826
{txt}{space 11}d_dist269 {c |}{col 22}{res}{space 2} 45.54357{col 34}{space 2} .0235896{col 45}{space 1} 1930.66{col 54}{space 3}0.000{col 62}{space 4} 45.49713{col 75}{space 3}    45.59
{txt}{space 11}d_dist270 {c |}{col 22}{res}{space 2} 57.15829{col 34}{space 2} .0234603{col 45}{space 1} 2436.38{col 54}{space 3}0.000{col 62}{space 4} 57.11211{col 75}{space 3} 57.20446
{txt}{space 11}d_dist271 {c |}{col 22}{res}{space 2} 18.27499{col 34}{space 2} .9031036{col 45}{space 1}   20.24{col 54}{space 3}0.000{col 62}{space 4} 16.49741{col 75}{space 3} 20.05256
{txt}{space 11}d_dist272 {c |}{col 22}{res}{space 2}  13.5582{col 34}{space 2} .2682553{col 45}{space 1}   50.54{col 54}{space 3}0.000{col 62}{space 4}  13.0302{col 75}{space 3} 14.08621
{txt}{space 11}d_dist273 {c |}{col 22}{res}{space 2} 11.78805{col 34}{space 2} .2713506{col 45}{space 1}   43.44{col 54}{space 3}0.000{col 62}{space 4} 11.25395{col 75}{space 3} 12.32215
{txt}{space 11}d_dist274 {c |}{col 22}{res}{space 2}-14.31704{col 34}{space 2} 2.338055{col 45}{space 1}   -6.12{col 54}{space 3}0.000{col 62}{space 4}-18.91902{col 75}{space 3} -9.71506
{txt}{space 11}d_dist275 {c |}{col 22}{res}{space 2}-9.866068{col 34}{space 2} 1.338435{col 45}{space 1}   -7.37{col 54}{space 3}0.000{col 62}{space 4} -12.5005{col 75}{space 3}-7.231636
{txt}{space 11}d_dist276 {c |}{col 22}{res}{space 2} 19.14926{col 34}{space 2} .3920152{col 45}{space 1}   48.85{col 54}{space 3}0.000{col 62}{space 4} 18.37766{col 75}{space 3} 19.92086
{txt}{space 11}d_dist277 {c |}{col 22}{res}{space 2} 40.28165{col 34}{space 2} .5308493{col 45}{space 1}   75.88{col 54}{space 3}0.000{col 62}{space 4} 39.23678{col 75}{space 3} 41.32652
{txt}{space 11}d_dist278 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist279 {c |}{col 22}{res}{space 2} 16.89078{col 34}{space 2} .9277236{col 45}{space 1}   18.21{col 54}{space 3}0.000{col 62}{space 4} 15.06475{col 75}{space 3} 18.71681
{txt}{space 11}d_dist280 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist281 {c |}{col 22}{res}{space 2} 30.55228{col 34}{space 2} .1258448{col 45}{space 1}  242.78{col 54}{space 3}0.000{col 62}{space 4} 30.30458{col 75}{space 3} 30.79998
{txt}{space 11}d_dist282 {c |}{col 22}{res}{space 2} 26.68984{col 34}{space 2} .6672129{col 45}{space 1}   40.00{col 54}{space 3}0.000{col 62}{space 4} 25.37657{col 75}{space 3} 28.00312
{txt}{space 11}d_dist283 {c |}{col 22}{res}{space 2} 44.78178{col 34}{space 2} .3126402{col 45}{space 1}  143.24{col 54}{space 3}0.000{col 62}{space 4} 44.16642{col 75}{space 3} 45.39715
{txt}{space 11}d_dist284 {c |}{col 22}{res}{space 2}-9.649788{col 34}{space 2} .0543773{col 45}{space 1} -177.46{col 54}{space 3}0.000{col 62}{space 4}-9.756818{col 75}{space 3}-9.542757
{txt}{space 11}d_dist285 {c |}{col 22}{res}{space 2}-10.01165{col 34}{space 2} .7306901{col 45}{space 1}  -13.70{col 54}{space 3}0.000{col 62}{space 4}-11.44987{col 75}{space 3} -8.57344
{txt}{space 11}d_dist286 {c |}{col 22}{res}{space 2} 35.63895{col 34}{space 2}  .922257{col 45}{space 1}   38.64{col 54}{space 3}0.000{col 62}{space 4} 33.82368{col 75}{space 3} 37.45422
{txt}{space 11}d_dist287 {c |}{col 22}{res}{space 2} 12.70923{col 34}{space 2} .8818227{col 45}{space 1}   14.41{col 54}{space 3}0.000{col 62}{space 4} 10.97354{col 75}{space 3} 14.44492
{txt}{space 15}inter {c |}{col 22}{res}{space 2} .8016646{col 34}{space 2} .3703279{col 45}{space 1}    2.16{col 54}{space 3}0.031{col 62}{space 4} .0727506{col 75}{space 3} 1.530578
{txt}cum_capacity_turbine {c |}{col 22}{res}{space 2}  .003514{col 34}{space 2} .0032233{col 45}{space 1}    1.09{col 54}{space 3}0.277{col 62}{space 4}-.0028304{col 75}{space 3} .0098584
{txt}{space 15}_cons {c |}{col 22}{res}{space 2} 69.27118{col 34}{space 2} 3.944296{col 45}{space 1}   17.56{col 54}{space 3}0.000{col 62}{space 4} 61.50765{col 75}{space 3} 77.03471
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{res}{txt}note: d_sy16 omitted because of collinearity
note: d_sy20 omitted because of collinearity
note: d_sy32 omitted because of collinearity
note: d_sy53 omitted because of collinearity
note: d_sy60 omitted because of collinearity
note: d_dist8 omitted because of collinearity
note: d_dist18 omitted because of collinearity
note: d_dist65 omitted because of collinearity
note: d_dist69 omitted because of collinearity
note: d_dist77 omitted because of collinearity
note: d_dist94 omitted because of collinearity
note: d_dist105 omitted because of collinearity
note: d_dist117 omitted because of collinearity
note: d_dist132 omitted because of collinearity
note: d_dist138 omitted because of collinearity
note: d_dist151 omitted because of collinearity
note: d_dist167 omitted because of collinearity
note: d_dist198 omitted because of collinearity
note: d_dist210 omitted because of collinearity
note: d_dist220 omitted because of collinearity
note: d_dist234 omitted because of collinearity
note: d_dist239 omitted because of collinearity
note: d_dist244 omitted because of collinearity
note: d_dist262 omitted because of collinearity
note: d_dist274 omitted because of collinearity
note: d_dist280 omitted because of collinearity

Linear regression                               Number of obs     = {res}     1,144
                                                {txt}{help j_robustsingular:F(70, 286) }       =  {res}        .
                                                {txt}Prob > F          = {res}         .
                                                {txt}R-squared         = {res}    0.8881
                                                {txt}Root MSE          =    {res} 8.9637

{txt}{ralign 83:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}demvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 12}d_sy1 {c |}{col 19}{res}{space 2}-29.00913{col 31}{space 2} 6.036981{col 42}{space 1}   -4.81{col 51}{space 3}0.000{col 59}{space 4}-40.89168{col 72}{space 3}-17.12658
{txt}{space 12}d_sy2 {c |}{col 19}{res}{space 2}-21.23804{col 31}{space 2} 3.895938{col 42}{space 1}   -5.45{col 51}{space 3}0.000{col 59}{space 4}-28.90638{col 72}{space 3}-13.56969
{txt}{space 12}d_sy3 {c |}{col 19}{res}{space 2}-16.01319{col 31}{space 2} 2.932499{col 42}{space 1}   -5.46{col 51}{space 3}0.000{col 59}{space 4}-21.78521{col 72}{space 3}-10.24117
{txt}{space 12}d_sy4 {c |}{col 19}{res}{space 2}-25.30781{col 31}{space 2} 3.288788{col 42}{space 1}   -7.70{col 51}{space 3}0.000{col 59}{space 4}-31.78111{col 72}{space 3}-18.83451
{txt}{space 12}d_sy5 {c |}{col 19}{res}{space 2}-38.12473{col 31}{space 2} 26.13348{col 42}{space 1}   -1.46{col 51}{space 3}0.146{col 59}{space 4}-89.56307{col 72}{space 3} 13.31362
{txt}{space 12}d_sy6 {c |}{col 19}{res}{space 2}-37.83089{col 31}{space 2}  25.9102{col 42}{space 1}   -1.46{col 51}{space 3}0.145{col 59}{space 4}-88.82977{col 72}{space 3} 13.16799
{txt}{space 12}d_sy7 {c |}{col 19}{res}{space 2}-35.51346{col 31}{space 2} 25.36156{col 42}{space 1}   -1.40{col 51}{space 3}0.163{col 59}{space 4}-85.43244{col 72}{space 3} 14.40552
{txt}{space 12}d_sy8 {c |}{col 19}{res}{space 2}-46.02063{col 31}{space 2}  24.9678{col 42}{space 1}   -1.84{col 51}{space 3}0.066{col 59}{space 4}-95.16458{col 72}{space 3} 3.123322
{txt}{space 12}d_sy9 {c |}{col 19}{res}{space 2}-30.12818{col 31}{space 2} 4.794914{col 42}{space 1}   -6.28{col 51}{space 3}0.000{col 59}{space 4}-39.56598{col 72}{space 3}-20.69038
{txt}{space 11}d_sy10 {c |}{col 19}{res}{space 2}-24.05619{col 31}{space 2} 3.955777{col 42}{space 1}   -6.08{col 51}{space 3}0.000{col 59}{space 4}-31.84232{col 72}{space 3}-16.27006
{txt}{space 11}d_sy11 {c |}{col 19}{res}{space 2}-30.81816{col 31}{space 2} 3.773343{col 42}{space 1}   -8.17{col 51}{space 3}0.000{col 59}{space 4}-38.24521{col 72}{space 3}-23.39112
{txt}{space 11}d_sy12 {c |}{col 19}{res}{space 2}-42.33267{col 31}{space 2} 3.526686{col 42}{space 1}  -12.00{col 51}{space 3}0.000{col 59}{space 4}-49.27422{col 72}{space 3}-35.39111
{txt}{space 11}d_sy13 {c |}{col 19}{res}{space 2} -3.54079{col 31}{space 2} 3.966963{col 42}{space 1}   -0.89{col 51}{space 3}0.373{col 59}{space 4}-11.34894{col 72}{space 3} 4.267356
{txt}{space 11}d_sy14 {c |}{col 19}{res}{space 2}-5.169212{col 31}{space 2} 3.200592{col 42}{space 1}   -1.62{col 51}{space 3}0.107{col 59}{space 4}-11.46892{col 72}{space 3} 1.130491
{txt}{space 11}d_sy15 {c |}{col 19}{res}{space 2} 6.265519{col 31}{space 2} 1.684872{col 42}{space 1}    3.72{col 51}{space 3}0.000{col 59}{space 4} 2.949197{col 72}{space 3} 9.581841
{txt}{space 11}d_sy16 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 11}d_sy17 {c |}{col 19}{res}{space 2} 3.314241{col 31}{space 2} 9.483565{col 42}{space 1}    0.35{col 51}{space 3}0.727{col 59}{space 4} -15.3522{col 72}{space 3} 21.98068
{txt}{space 11}d_sy18 {c |}{col 19}{res}{space 2} 12.05987{col 31}{space 2}  4.61566{col 42}{space 1}    2.61{col 51}{space 3}0.009{col 59}{space 4} 2.974893{col 72}{space 3} 21.14484
{txt}{space 11}d_sy19 {c |}{col 19}{res}{space 2} 7.555243{col 31}{space 2} 1.396999{col 42}{space 1}    5.41{col 51}{space 3}0.000{col 59}{space 4} 4.805539{col 72}{space 3} 10.30495
{txt}{space 11}d_sy20 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 11}d_sy21 {c |}{col 19}{res}{space 2} 6.513914{col 31}{space 2} 4.211343{col 42}{space 1}    1.55{col 51}{space 3}0.123{col 59}{space 4}-1.775245{col 72}{space 3} 14.80307
{txt}{space 11}d_sy22 {c |}{col 19}{res}{space 2} 6.765684{col 31}{space 2} 2.840116{col 42}{space 1}    2.38{col 51}{space 3}0.018{col 59}{space 4} 1.175503{col 72}{space 3} 12.35586
{txt}{space 11}d_sy23 {c |}{col 19}{res}{space 2} 6.671953{col 31}{space 2} 3.350311{col 42}{space 1}    1.99{col 51}{space 3}0.047{col 59}{space 4} .0775592{col 72}{space 3} 13.26635
{txt}{space 11}d_sy24 {c |}{col 19}{res}{space 2}-6.271731{col 31}{space 2} 1.417411{col 42}{space 1}   -4.42{col 51}{space 3}0.000{col 59}{space 4}-9.061611{col 72}{space 3}-3.481851
{txt}{space 11}d_sy25 {c |}{col 19}{res}{space 2}-36.21162{col 31}{space 2} 3.766383{col 42}{space 1}   -9.61{col 51}{space 3}0.000{col 59}{space 4}-43.62496{col 72}{space 3}-28.79827
{txt}{space 11}d_sy26 {c |}{col 19}{res}{space 2}-32.17282{col 31}{space 2} 2.585356{col 42}{space 1}  -12.44{col 51}{space 3}0.000{col 59}{space 4}-37.26156{col 72}{space 3}-27.08408
{txt}{space 11}d_sy27 {c |}{col 19}{res}{space 2}-32.02349{col 31}{space 2}  1.80313{col 42}{space 1}  -17.76{col 51}{space 3}0.000{col 59}{space 4}-35.57258{col 72}{space 3} -28.4744
{txt}{space 11}d_sy28 {c |}{col 19}{res}{space 2}-47.48489{col 31}{space 2} 2.047219{col 42}{space 1}  -23.19{col 51}{space 3}0.000{col 59}{space 4}-51.51441{col 72}{space 3}-43.45536
{txt}{space 11}d_sy29 {c |}{col 19}{res}{space 2}  13.5412{col 31}{space 2} 8.977979{col 42}{space 1}    1.51{col 51}{space 3}0.133{col 59}{space 4} -4.13009{col 72}{space 3}  31.2125
{txt}{space 11}d_sy30 {c |}{col 19}{res}{space 2} 19.17357{col 31}{space 2} 7.797701{col 42}{space 1}    2.46{col 51}{space 3}0.015{col 59}{space 4} 3.825409{col 72}{space 3} 34.52173
{txt}{space 11}d_sy31 {c |}{col 19}{res}{space 2} 9.531993{col 31}{space 2} 6.822499{col 42}{space 1}    1.40{col 51}{space 3}0.163{col 59}{space 4}-3.896686{col 72}{space 3} 22.96067
{txt}{space 11}d_sy32 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 11}d_sy33 {c |}{col 19}{res}{space 2}-37.99426{col 31}{space 2} 3.856119{col 42}{space 1}   -9.85{col 51}{space 3}0.000{col 59}{space 4}-45.58423{col 72}{space 3}-30.40428
{txt}{space 11}d_sy34 {c |}{col 19}{res}{space 2}-30.84796{col 31}{space 2} 4.595534{col 42}{space 1}   -6.71{col 51}{space 3}0.000{col 59}{space 4}-39.89332{col 72}{space 3} -21.8026
{txt}{space 11}d_sy35 {c |}{col 19}{res}{space 2}-34.43042{col 31}{space 2} 2.296195{col 42}{space 1}  -14.99{col 51}{space 3}0.000{col 59}{space 4}   -38.95{col 72}{space 3}-29.91083
{txt}{space 11}d_sy36 {c |}{col 19}{res}{space 2} -43.0249{col 31}{space 2} 2.059443{col 42}{space 1}  -20.89{col 51}{space 3}0.000{col 59}{space 4}-47.07849{col 72}{space 3}-38.97131
{txt}{space 11}d_sy37 {c |}{col 19}{res}{space 2} 15.31576{col 31}{space 2} 6.396617{col 42}{space 1}    2.39{col 51}{space 3}0.017{col 59}{space 4} 2.725337{col 72}{space 3} 27.90617
{txt}{space 11}d_sy38 {c |}{col 19}{res}{space 2} 18.96831{col 31}{space 2} 4.816757{col 42}{space 1}    3.94{col 51}{space 3}0.000{col 59}{space 4} 9.487524{col 72}{space 3} 28.44911
{txt}{space 11}d_sy39 {c |}{col 19}{res}{space 2} 13.54921{col 31}{space 2} 5.042786{col 42}{space 1}    2.69{col 51}{space 3}0.008{col 59}{space 4} 3.623526{col 72}{space 3} 23.47489
{txt}{space 11}d_sy40 {c |}{col 19}{res}{space 2}-14.63587{col 31}{space 2} 3.301087{col 42}{space 1}   -4.43{col 51}{space 3}0.000{col 59}{space 4}-21.13338{col 72}{space 3}-8.138365
{txt}{space 11}d_sy41 {c |}{col 19}{res}{space 2}-42.66204{col 31}{space 2} 3.817613{col 42}{space 1}  -11.18{col 51}{space 3}0.000{col 59}{space 4}-50.17622{col 72}{space 3}-35.14786
{txt}{space 11}d_sy42 {c |}{col 19}{res}{space 2}-39.28525{col 31}{space 2} 2.958255{col 42}{space 1}  -13.28{col 51}{space 3}0.000{col 59}{space 4}-45.10797{col 72}{space 3}-33.46254
{txt}{space 11}d_sy43 {c |}{col 19}{res}{space 2}-44.05927{col 31}{space 2} 1.340197{col 42}{space 1}  -32.88{col 51}{space 3}0.000{col 59}{space 4}-46.69718{col 72}{space 3}-41.42137
{txt}{space 11}d_sy44 {c |}{col 19}{res}{space 2} -55.7078{col 31}{space 2} 2.276135{col 42}{space 1}  -24.47{col 51}{space 3}0.000{col 59}{space 4} -60.1879{col 72}{space 3} -51.2277
{txt}{space 11}d_sy45 {c |}{col 19}{res}{space 2}-25.57091{col 31}{space 2}  6.17821{col 42}{space 1}   -4.14{col 51}{space 3}0.000{col 59}{space 4}-37.73144{col 72}{space 3}-13.41038
{txt}{space 11}d_sy46 {c |}{col 19}{res}{space 2}-26.97102{col 31}{space 2} 4.493041{col 42}{space 1}   -6.00{col 51}{space 3}0.000{col 59}{space 4}-35.81465{col 72}{space 3} -18.1274
{txt}{space 11}d_sy47 {c |}{col 19}{res}{space 2}-27.02012{col 31}{space 2} 3.946423{col 42}{space 1}   -6.85{col 51}{space 3}0.000{col 59}{space 4}-34.78784{col 72}{space 3} -19.2524
{txt}{space 11}d_sy48 {c |}{col 19}{res}{space 2} -40.1399{col 31}{space 2} 4.796863{col 42}{space 1}   -8.37{col 51}{space 3}0.000{col 59}{space 4}-49.58153{col 72}{space 3}-30.69827
{txt}{space 11}d_sy49 {c |}{col 19}{res}{space 2}-36.69306{col 31}{space 2} 3.960006{col 42}{space 1}   -9.27{col 51}{space 3}0.000{col 59}{space 4}-44.48751{col 72}{space 3} -28.8986
{txt}{space 11}d_sy50 {c |}{col 19}{res}{space 2}-35.57636{col 31}{space 2} 2.953684{col 42}{space 1}  -12.04{col 51}{space 3}0.000{col 59}{space 4}-41.39008{col 72}{space 3}-29.76265
{txt}{space 11}d_sy51 {c |}{col 19}{res}{space 2}-34.86694{col 31}{space 2} 3.126103{col 42}{space 1}  -11.15{col 51}{space 3}0.000{col 59}{space 4}-41.02002{col 72}{space 3}-28.71385
{txt}{space 11}d_sy52 {c |}{col 19}{res}{space 2}-51.66364{col 31}{space 2} 3.829928{col 42}{space 1}  -13.49{col 51}{space 3}0.000{col 59}{space 4}-59.20206{col 72}{space 3}-44.12521
{txt}{space 11}d_sy53 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 11}d_sy54 {c |}{col 19}{res}{space 2} 5.421472{col 31}{space 2} 5.542866{col 42}{space 1}    0.98{col 51}{space 3}0.329{col 59}{space 4}-5.488514{col 72}{space 3} 16.33146
{txt}{space 11}d_sy55 {c |}{col 19}{res}{space 2} 4.176275{col 31}{space 2} 4.421123{col 42}{space 1}    0.94{col 51}{space 3}0.346{col 59}{space 4}-4.525792{col 72}{space 3} 12.87834
{txt}{space 11}d_sy56 {c |}{col 19}{res}{space 2}-5.252254{col 31}{space 2} 4.789071{col 42}{space 1}   -1.10{col 51}{space 3}0.274{col 59}{space 4}-14.67855{col 72}{space 3} 4.174043
{txt}{space 11}d_sy57 {c |}{col 19}{res}{space 2}-1.171623{col 31}{space 2} 3.471741{col 42}{space 1}   -0.34{col 51}{space 3}0.736{col 59}{space 4}-8.005027{col 72}{space 3} 5.661781
{txt}{space 11}d_sy58 {c |}{col 19}{res}{space 2} 10.77666{col 31}{space 2} 2.481098{col 42}{space 1}    4.34{col 51}{space 3}0.000{col 59}{space 4} 5.893133{col 72}{space 3} 15.66019
{txt}{space 11}d_sy59 {c |}{col 19}{res}{space 2} 11.19504{col 31}{space 2} 1.150628{col 42}{space 1}    9.73{col 51}{space 3}0.000{col 59}{space 4} 8.930269{col 72}{space 3} 13.45981
{txt}{space 11}d_sy60 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 11}d_sy61 {c |}{col 19}{res}{space 2}-.1052923{col 31}{space 2} 4.390332{col 42}{space 1}   -0.02{col 51}{space 3}0.981{col 59}{space 4}-8.746753{col 72}{space 3} 8.536168
{txt}{space 11}d_sy62 {c |}{col 19}{res}{space 2} 2.520085{col 31}{space 2} 3.618059{col 42}{space 1}    0.70{col 51}{space 3}0.487{col 59}{space 4}-4.601315{col 72}{space 3} 9.641485
{txt}{space 11}d_sy63 {c |}{col 19}{res}{space 2}-1.827363{col 31}{space 2}  2.36848{col 42}{space 1}   -0.77{col 51}{space 3}0.441{col 59}{space 4}-6.489226{col 72}{space 3}   2.8345
{txt}{space 11}d_sy64 {c |}{col 19}{res}{space 2}-11.68481{col 31}{space 2}  1.85136{col 42}{space 1}   -6.31{col 51}{space 3}0.000{col 59}{space 4}-15.32883{col 72}{space 3}-8.040794
{txt}{space 11}d_sy65 {c |}{col 19}{res}{space 2}-30.92223{col 31}{space 2} 3.733414{col 42}{space 1}   -8.28{col 51}{space 3}0.000{col 59}{space 4}-38.27069{col 72}{space 3}-23.57378
{txt}{space 11}d_sy66 {c |}{col 19}{res}{space 2}-24.16315{col 31}{space 2} 2.929329{col 42}{space 1}   -8.25{col 51}{space 3}0.000{col 59}{space 4}-29.92893{col 72}{space 3}-18.39737
{txt}{space 11}d_sy67 {c |}{col 19}{res}{space 2}-29.37695{col 31}{space 2} 1.941293{col 42}{space 1}  -15.13{col 51}{space 3}0.000{col 59}{space 4}-33.19798{col 72}{space 3}-25.55591
{txt}{space 11}d_sy68 {c |}{col 19}{res}{space 2} -38.9438{col 31}{space 2} 2.302468{col 42}{space 1}  -16.91{col 51}{space 3}0.000{col 59}{space 4}-43.47573{col 72}{space 3}-34.41187
{txt}{space 11}d_sy69 {c |}{col 19}{res}{space 2}-38.25049{col 31}{space 2} 4.315877{col 42}{space 1}   -8.86{col 51}{space 3}0.000{col 59}{space 4} -46.7454{col 72}{space 3}-29.75558
{txt}{space 11}d_sy70 {c |}{col 19}{res}{space 2}-34.49295{col 31}{space 2} 3.999026{col 42}{space 1}   -8.63{col 51}{space 3}0.000{col 59}{space 4}-42.36421{col 72}{space 3} -26.6217
{txt}{space 11}d_sy71 {c |}{col 19}{res}{space 2}-36.21541{col 31}{space 2} 2.631405{col 42}{space 1}  -13.76{col 51}{space 3}0.000{col 59}{space 4}-41.39479{col 72}{space 3}-31.03604
{txt}{space 11}d_sy72 {c |}{col 19}{res}{space 2}-47.21608{col 31}{space 2}   2.3137{col 42}{space 1}  -20.41{col 51}{space 3}0.000{col 59}{space 4}-51.77012{col 72}{space 3}-42.66204
{txt}{space 11}d_sy73 {c |}{col 19}{res}{space 2} .8684202{col 31}{space 2} 6.307909{col 42}{space 1}    0.14{col 51}{space 3}0.891{col 59}{space 4}-11.54739{col 72}{space 3} 13.28424
{txt}{space 11}d_sy74 {c |}{col 19}{res}{space 2} 1.123462{col 31}{space 2} 3.255949{col 42}{space 1}    0.35{col 51}{space 3}0.730{col 59}{space 4}-5.285201{col 72}{space 3} 7.532125
{txt}{space 11}d_sy75 {c |}{col 19}{res}{space 2}-1.980016{col 31}{space 2} 2.157391{col 42}{space 1}   -0.92{col 51}{space 3}0.360{col 59}{space 4}-6.226394{col 72}{space 3} 2.266363
{txt}{space 11}d_sy76 {c |}{col 19}{res}{space 2}-13.13701{col 31}{space 2} 1.423232{col 42}{space 1}   -9.23{col 51}{space 3}0.000{col 59}{space 4}-15.93834{col 72}{space 3}-10.33567
{txt}{space 11}d_sy77 {c |}{col 19}{res}{space 2}-5.977141{col 31}{space 2} 6.979376{col 42}{space 1}   -0.86{col 51}{space 3}0.392{col 59}{space 4} -19.7146{col 72}{space 3} 7.760317
{txt}{space 11}d_sy78 {c |}{col 19}{res}{space 2} 5.047544{col 31}{space 2} 4.817526{col 42}{space 1}    1.05{col 51}{space 3}0.296{col 59}{space 4} -4.43476{col 72}{space 3} 14.52985
{txt}{space 11}d_sy79 {c |}{col 19}{res}{space 2}-1.852181{col 31}{space 2} 3.253209{col 42}{space 1}   -0.57{col 51}{space 3}0.570{col 59}{space 4}-8.255451{col 72}{space 3} 4.551088
{txt}{space 11}d_sy80 {c |}{col 19}{res}{space 2}-21.64255{col 31}{space 2} 5.344459{col 42}{space 1}   -4.05{col 51}{space 3}0.000{col 59}{space 4}-32.16201{col 72}{space 3}-11.12309
{txt}{space 11}d_sy81 {c |}{col 19}{res}{space 2}-50.95653{col 31}{space 2} 6.978262{col 42}{space 1}   -7.30{col 51}{space 3}0.000{col 59}{space 4} -64.6918{col 72}{space 3}-37.22127
{txt}{space 11}d_sy82 {c |}{col 19}{res}{space 2}-51.33019{col 31}{space 2} 6.225494{col 42}{space 1}   -8.25{col 51}{space 3}0.000{col 59}{space 4}-63.58379{col 72}{space 3} -39.0766
{txt}{space 11}d_sy83 {c |}{col 19}{res}{space 2}-39.83573{col 31}{space 2} 8.448361{col 42}{space 1}   -4.72{col 51}{space 3}0.000{col 59}{space 4}-56.46458{col 72}{space 3}-23.20688
{txt}{space 11}d_sy84 {c |}{col 19}{res}{space 2}-63.05537{col 31}{space 2} 5.593044{col 42}{space 1}  -11.27{col 51}{space 3}0.000{col 59}{space 4}-74.06412{col 72}{space 3}-52.04662
{txt}{space 11}d_sy85 {c |}{col 19}{res}{space 2} 17.12079{col 31}{space 2} 6.279421{col 42}{space 1}    2.73{col 51}{space 3}0.007{col 59}{space 4} 4.761048{col 72}{space 3} 29.48053
{txt}{space 11}d_sy86 {c |}{col 19}{res}{space 2} 23.20318{col 31}{space 2} 3.639698{col 42}{space 1}    6.38{col 51}{space 3}0.000{col 59}{space 4} 16.03919{col 72}{space 3} 30.36717
{txt}{space 11}d_sy87 {c |}{col 19}{res}{space 2} 19.67235{col 31}{space 2} 3.192396{col 42}{space 1}    6.16{col 51}{space 3}0.000{col 59}{space 4} 13.38878{col 72}{space 3} 25.95592
{txt}{space 11}d_sy88 {c |}{col 19}{res}{space 2} 9.868746{col 31}{space 2} 2.520441{col 42}{space 1}    3.92{col 51}{space 3}0.000{col 59}{space 4} 4.907779{col 72}{space 3} 14.82971
{txt}{space 11}d_sy89 {c |}{col 19}{res}{space 2}-45.30236{col 31}{space 2} 4.931532{col 42}{space 1}   -9.19{col 51}{space 3}0.000{col 59}{space 4}-55.00906{col 72}{space 3}-35.59566
{txt}{space 11}d_sy90 {c |}{col 19}{res}{space 2} -40.4931{col 31}{space 2} 3.827555{col 42}{space 1}  -10.58{col 51}{space 3}0.000{col 59}{space 4}-48.02685{col 72}{space 3}-32.95935
{txt}{space 11}d_sy91 {c |}{col 19}{res}{space 2} -36.1905{col 31}{space 2} 5.610855{col 42}{space 1}   -6.45{col 51}{space 3}0.000{col 59}{space 4}-47.23431{col 72}{space 3}-25.14669
{txt}{space 11}d_sy92 {c |}{col 19}{res}{space 2}-60.30346{col 31}{space 2} 5.381646{col 42}{space 1}  -11.21{col 51}{space 3}0.000{col 59}{space 4}-70.89611{col 72}{space 3} -49.7108
{txt}{space 11}d_sy93 {c |}{col 19}{res}{space 2}-35.53504{col 31}{space 2} 4.544862{col 42}{space 1}   -7.82{col 51}{space 3}0.000{col 59}{space 4}-44.48066{col 72}{space 3}-26.58942
{txt}{space 11}d_sy94 {c |}{col 19}{res}{space 2}-36.51765{col 31}{space 2} 3.589045{col 42}{space 1}  -10.17{col 51}{space 3}0.000{col 59}{space 4}-43.58194{col 72}{space 3}-29.45336
{txt}{space 11}d_sy95 {c |}{col 19}{res}{space 2}-41.24858{col 31}{space 2} 2.855735{col 42}{space 1}  -14.44{col 51}{space 3}0.000{col 59}{space 4}-46.86951{col 72}{space 3}-35.62766
{txt}{space 11}d_sy96 {c |}{col 19}{res}{space 2}-48.90747{col 31}{space 2} 3.972107{col 42}{space 1}  -12.31{col 51}{space 3}0.000{col 59}{space 4}-56.72574{col 72}{space 3} -41.0892
{txt}{space 11}d_sy97 {c |}{col 19}{res}{space 2}-33.53751{col 31}{space 2} 7.361787{col 42}{space 1}   -4.56{col 51}{space 3}0.000{col 59}{space 4}-48.02767{col 72}{space 3}-19.04736
{txt}{space 11}d_sy98 {c |}{col 19}{res}{space 2}-39.78796{col 31}{space 2} 4.807841{col 42}{space 1}   -8.28{col 51}{space 3}0.000{col 59}{space 4} -49.2512{col 72}{space 3}-30.32472
{txt}{space 11}d_sy99 {c |}{col 19}{res}{space 2}-38.53713{col 31}{space 2} 5.575995{col 42}{space 1}   -6.91{col 51}{space 3}0.000{col 59}{space 4}-49.51233{col 72}{space 3}-27.56194
{txt}{space 10}d_sy100 {c |}{col 19}{res}{space 2} -48.3304{col 31}{space 2} 3.229555{col 42}{space 1}  -14.97{col 51}{space 3}0.000{col 59}{space 4}-54.68711{col 72}{space 3}-41.97369
{txt}{space 10}d_dist1 {c |}{col 19}{res}{space 2}-2.884998{col 31}{space 2} .0969222{col 42}{space 1}  -29.77{col 51}{space 3}0.000{col 59}{space 4} -3.07577{col 72}{space 3}-2.694227
{txt}{space 10}d_dist2 {c |}{col 19}{res}{space 2}-12.53538{col 31}{space 2} .0471334{col 42}{space 1} -265.96{col 51}{space 3}0.000{col 59}{space 4}-12.62815{col 72}{space 3}-12.44261
{txt}{space 10}d_dist3 {c |}{col 19}{res}{space 2}-17.63945{col 31}{space 2} .3633867{col 42}{space 1}  -48.54{col 51}{space 3}0.000{col 59}{space 4} -18.3547{col 72}{space 3} -16.9242
{txt}{space 10}d_dist4 {c |}{col 19}{res}{space 2} 25.27581{col 31}{space 2} .6225442{col 42}{space 1}   40.60{col 51}{space 3}0.000{col 59}{space 4} 24.05046{col 72}{space 3} 26.50116
{txt}{space 10}d_dist5 {c |}{col 19}{res}{space 2}-1.827711{col 31}{space 2} .2199045{col 42}{space 1}   -8.31{col 51}{space 3}0.000{col 59}{space 4}-2.260547{col 72}{space 3}-1.394874
{txt}{space 10}d_dist6 {c |}{col 19}{res}{space 2}-33.52573{col 31}{space 2}   .05288{col 42}{space 1} -634.00{col 51}{space 3}0.000{col 59}{space 4}-33.62982{col 72}{space 3}-33.42165
{txt}{space 10}d_dist7 {c |}{col 19}{res}{space 2} 12.42816{col 31}{space 2} .3740811{col 42}{space 1}   33.22{col 51}{space 3}0.000{col 59}{space 4} 11.69186{col 72}{space 3} 13.16446
{txt}{space 10}d_dist8 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 10}d_dist9 {c |}{col 19}{res}{space 2} 37.20962{col 31}{space 2} 24.76452{col 42}{space 1}    1.50{col 51}{space 3}0.134{col 59}{space 4}-11.53421{col 72}{space 3} 85.95346
{txt}{space 9}d_dist10 {c |}{col 19}{res}{space 2} 4.452475{col 31}{space 2} 24.74645{col 42}{space 1}    0.18{col 51}{space 3}0.857{col 59}{space 4}-44.25579{col 72}{space 3} 53.16074
{txt}{space 9}d_dist11 {c |}{col 19}{res}{space 2} 8.460704{col 31}{space 2} 24.83642{col 42}{space 1}    0.34{col 51}{space 3}0.734{col 59}{space 4}-40.42465{col 72}{space 3} 57.34606
{txt}{space 9}d_dist12 {c |}{col 19}{res}{space 2} 8.333401{col 31}{space 2} 24.79538{col 42}{space 1}    0.34{col 51}{space 3}0.737{col 59}{space 4}-40.47119{col 72}{space 3} 57.13799
{txt}{space 9}d_dist13 {c |}{col 19}{res}{space 2} 42.59306{col 31}{space 2} 24.75686{col 42}{space 1}    1.72{col 51}{space 3}0.086{col 59}{space 4}-6.135694{col 72}{space 3} 91.32182
{txt}{space 9}d_dist14 {c |}{col 19}{res}{space 2} 38.65795{col 31}{space 2} 24.85088{col 42}{space 1}    1.56{col 51}{space 3}0.121{col 59}{space 4}-10.25588{col 72}{space 3} 87.57178
{txt}{space 9}d_dist15 {c |}{col 19}{res}{space 2} 45.57442{col 31}{space 2} 25.01208{col 42}{space 1}    1.82{col 51}{space 3}0.069{col 59}{space 4}-3.656687{col 72}{space 3} 94.80552
{txt}{space 9}d_dist16 {c |}{col 19}{res}{space 2}   52.344{col 31}{space 2} 25.00901{col 42}{space 1}    2.09{col 51}{space 3}0.037{col 59}{space 4} 3.118945{col 72}{space 3} 101.5691
{txt}{space 9}d_dist17 {c |}{col 19}{res}{space 2} 56.15366{col 31}{space 2}  24.6866{col 42}{space 1}    2.27{col 51}{space 3}0.024{col 59}{space 4} 7.563199{col 72}{space 3} 104.7441
{txt}{space 9}d_dist18 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 9}d_dist19 {c |}{col 19}{res}{space 2} 8.275691{col 31}{space 2} 17.96641{col 42}{space 1}    0.46{col 51}{space 3}0.645{col 59}{space 4}-27.08746{col 72}{space 3} 43.63885
{txt}{space 9}d_dist20 {c |}{col 19}{res}{space 2} 43.47349{col 31}{space 2} 24.91042{col 42}{space 1}    1.75{col 51}{space 3}0.082{col 59}{space 4}-5.557525{col 72}{space 3} 92.50451
{txt}{space 9}d_dist21 {c |}{col 19}{res}{space 2} 41.88649{col 31}{space 2} 24.70995{col 42}{space 1}    1.70{col 51}{space 3}0.091{col 59}{space 4}-6.749943{col 72}{space 3} 90.52292
{txt}{space 9}d_dist22 {c |}{col 19}{res}{space 2}   40.688{col 31}{space 2} 24.72806{col 42}{space 1}    1.65{col 51}{space 3}0.101{col 59}{space 4}-7.984063{col 72}{space 3} 89.36007
{txt}{space 9}d_dist23 {c |}{col 19}{res}{space 2}  39.4962{col 31}{space 2} 24.66136{col 42}{space 1}    1.60{col 51}{space 3}0.110{col 59}{space 4}  -9.0446{col 72}{space 3} 88.03699
{txt}{space 9}d_dist24 {c |}{col 19}{res}{space 2} 41.14119{col 31}{space 2} 24.66136{col 42}{space 1}    1.67{col 51}{space 3}0.096{col 59}{space 4}-7.399602{col 72}{space 3} 89.68199
{txt}{space 9}d_dist25 {c |}{col 19}{res}{space 2} 39.52564{col 31}{space 2} 24.73973{col 42}{space 1}    1.60{col 51}{space 3}0.111{col 59}{space 4}-9.169415{col 72}{space 3} 88.22069
{txt}{space 9}d_dist26 {c |}{col 19}{res}{space 2} 38.72548{col 31}{space 2} 23.83434{col 42}{space 1}    1.62{col 51}{space 3}0.105{col 59}{space 4}-8.187498{col 72}{space 3} 85.63845
{txt}{space 9}d_dist27 {c |}{col 19}{res}{space 2}-6.554512{col 31}{space 2} 24.68218{col 42}{space 1}   -0.27{col 51}{space 3}0.791{col 59}{space 4}-55.13628{col 72}{space 3} 42.02725
{txt}{space 9}d_dist28 {c |}{col 19}{res}{space 2} 37.42571{col 31}{space 2} 24.67004{col 42}{space 1}    1.52{col 51}{space 3}0.130{col 59}{space 4}-11.13216{col 72}{space 3} 85.98359
{txt}{space 9}d_dist29 {c |}{col 19}{res}{space 2}-10.40858{col 31}{space 2} 24.71593{col 42}{space 1}   -0.42{col 51}{space 3}0.674{col 59}{space 4}-59.05679{col 72}{space 3} 38.23962
{txt}{space 9}d_dist30 {c |}{col 19}{res}{space 2}-54.90662{col 31}{space 2} 1.861103{col 42}{space 1}  -29.50{col 51}{space 3}0.000{col 59}{space 4}-58.56982{col 72}{space 3}-51.24343
{txt}{space 9}d_dist31 {c |}{col 19}{res}{space 2} 29.09703{col 31}{space 2} 25.13765{col 42}{space 1}    1.16{col 51}{space 3}0.248{col 59}{space 4}-20.38123{col 72}{space 3} 78.57529
{txt}{space 9}d_dist32 {c |}{col 19}{res}{space 2} 4.640746{col 31}{space 2} 24.91046{col 42}{space 1}    0.19{col 51}{space 3}0.852{col 59}{space 4}-44.39034{col 72}{space 3} 53.67184
{txt}{space 9}d_dist33 {c |}{col 19}{res}{space 2} 3.545766{col 31}{space 2} 24.97617{col 42}{space 1}    0.14{col 51}{space 3}0.887{col 59}{space 4}-45.61465{col 72}{space 3} 52.70619
{txt}{space 9}d_dist34 {c |}{col 19}{res}{space 2} 7.584352{col 31}{space 2} 24.96384{col 42}{space 1}    0.30{col 51}{space 3}0.761{col 59}{space 4}-41.55181{col 72}{space 3} 56.72051
{txt}{space 9}d_dist35 {c |}{col 19}{res}{space 2} 32.79291{col 31}{space 2} 25.10464{col 42}{space 1}    1.31{col 51}{space 3}0.193{col 59}{space 4}-16.62039{col 72}{space 3} 82.20621
{txt}{space 9}d_dist36 {c |}{col 19}{res}{space 2} 49.45649{col 31}{space 2} 24.76928{col 42}{space 1}    2.00{col 51}{space 3}0.047{col 59}{space 4} .7032829{col 72}{space 3} 98.20969
{txt}{space 9}d_dist37 {c |}{col 19}{res}{space 2} 36.73452{col 31}{space 2} 24.67608{col 42}{space 1}    1.49{col 51}{space 3}0.138{col 59}{space 4}-11.83524{col 72}{space 3} 85.30427
{txt}{space 9}d_dist38 {c |}{col 19}{res}{space 2} 41.50935{col 31}{space 2} 25.26218{col 42}{space 1}    1.64{col 51}{space 3}0.101{col 59}{space 4}-8.214038{col 72}{space 3} 91.23274
{txt}{space 9}d_dist39 {c |}{col 19}{res}{space 2}  58.6387{col 31}{space 2} 24.66136{col 42}{space 1}    2.38{col 51}{space 3}0.018{col 59}{space 4}  10.0979{col 72}{space 3} 107.1795
{txt}{space 9}d_dist40 {c |}{col 19}{res}{space 2}  60.3737{col 31}{space 2} 24.66377{col 42}{space 1}    2.45{col 51}{space 3}0.015{col 59}{space 4} 11.82816{col 72}{space 3} 108.9192
{txt}{space 9}d_dist41 {c |}{col 19}{res}{space 2}  36.0437{col 31}{space 2} 24.66136{col 42}{space 1}    1.46{col 51}{space 3}0.145{col 59}{space 4} -12.4971{col 72}{space 3} 84.58449
{txt}{space 9}d_dist42 {c |}{col 19}{res}{space 2}  44.0337{col 31}{space 2} 24.66136{col 42}{space 1}    1.79{col 51}{space 3}0.075{col 59}{space 4}  -4.5071{col 72}{space 3} 92.57449
{txt}{space 9}d_dist43 {c |}{col 19}{res}{space 2}  55.0637{col 31}{space 2} 24.66136{col 42}{space 1}    2.23{col 51}{space 3}0.026{col 59}{space 4} 6.522901{col 72}{space 3} 103.6045
{txt}{space 9}d_dist44 {c |}{col 19}{res}{space 2} 33.14592{col 31}{space 2} 24.70302{col 42}{space 1}    1.34{col 51}{space 3}0.181{col 59}{space 4}-15.47687{col 72}{space 3} 81.76871
{txt}{space 9}d_dist45 {c |}{col 19}{res}{space 2}  55.9912{col 31}{space 2} 24.66136{col 42}{space 1}    2.27{col 51}{space 3}0.024{col 59}{space 4}   7.4504{col 72}{space 3}  104.532
{txt}{space 9}d_dist46 {c |}{col 19}{res}{space 2} 54.73706{col 31}{space 2} 24.67365{col 42}{space 1}    2.22{col 51}{space 3}0.027{col 59}{space 4} 6.172073{col 72}{space 3}  103.302
{txt}{space 9}d_dist47 {c |}{col 19}{res}{space 2}  33.1912{col 31}{space 2} 24.66136{col 42}{space 1}    1.35{col 51}{space 3}0.179{col 59}{space 4} -15.3496{col 72}{space 3} 81.73199
{txt}{space 9}d_dist48 {c |}{col 19}{res}{space 2} .8401418{col 31}{space 2} 24.70944{col 42}{space 1}    0.03{col 51}{space 3}0.973{col 59}{space 4}-47.79528{col 72}{space 3} 49.47556
{txt}{space 9}d_dist49 {c |}{col 19}{res}{space 2} -17.6066{col 31}{space 2} 17.38062{col 42}{space 1}   -1.01{col 51}{space 3}0.312{col 59}{space 4}-51.81675{col 72}{space 3} 16.60355
{txt}{space 9}d_dist50 {c |}{col 19}{res}{space 2}-8.130505{col 31}{space 2} 24.97658{col 42}{space 1}   -0.33{col 51}{space 3}0.745{col 59}{space 4}-57.29174{col 72}{space 3} 41.03073
{txt}{space 9}d_dist51 {c |}{col 19}{res}{space 2} 29.70751{col 31}{space 2} 25.32725{col 42}{space 1}    1.17{col 51}{space 3}0.242{col 59}{space 4}-20.14395{col 72}{space 3} 79.55896
{txt}{space 9}d_dist52 {c |}{col 19}{res}{space 2} 8.108979{col 31}{space 2} 24.86486{col 42}{space 1}    0.33{col 51}{space 3}0.745{col 59}{space 4}-40.83236{col 72}{space 3} 57.05032
{txt}{space 9}d_dist53 {c |}{col 19}{res}{space 2}-3.775388{col 31}{space 2} 17.91148{col 42}{space 1}   -0.21{col 51}{space 3}0.833{col 59}{space 4}-39.03043{col 72}{space 3} 31.47965
{txt}{space 9}d_dist54 {c |}{col 19}{res}{space 2} 5.811346{col 31}{space 2} 24.75675{col 42}{space 1}    0.23{col 51}{space 3}0.815{col 59}{space 4}-42.91719{col 72}{space 3} 54.53988
{txt}{space 9}d_dist55 {c |}{col 19}{res}{space 2}  30.9687{col 31}{space 2} 24.66136{col 42}{space 1}    1.26{col 51}{space 3}0.210{col 59}{space 4} -17.5721{col 72}{space 3} 79.50949
{txt}{space 9}d_dist56 {c |}{col 19}{res}{space 2} 5.002561{col 31}{space 2}  24.7306{col 42}{space 1}    0.20{col 51}{space 3}0.840{col 59}{space 4} -43.6745{col 72}{space 3} 53.67963
{txt}{space 9}d_dist57 {c |}{col 19}{res}{space 2} 2.188298{col 31}{space 2} 24.82793{col 42}{space 1}    0.09{col 51}{space 3}0.930{col 59}{space 4}-46.68035{col 72}{space 3} 51.05695
{txt}{space 9}d_dist58 {c |}{col 19}{res}{space 2} 10.52119{col 31}{space 2} 24.66136{col 42}{space 1}    0.43{col 51}{space 3}0.670{col 59}{space 4} -38.0196{col 72}{space 3} 59.06199
{txt}{space 9}d_dist59 {c |}{col 19}{res}{space 2} 32.47032{col 31}{space 2} 24.97258{col 42}{space 1}    1.30{col 51}{space 3}0.195{col 59}{space 4}-16.68304{col 72}{space 3} 81.62368
{txt}{space 9}d_dist60 {c |}{col 19}{res}{space 2}-1.217552{col 31}{space 2} 24.96822{col 42}{space 1}   -0.05{col 51}{space 3}0.961{col 59}{space 4}-50.36232{col 72}{space 3} 47.92722
{txt}{space 9}d_dist61 {c |}{col 19}{res}{space 2} 36.25236{col 31}{space 2} 24.67707{col 42}{space 1}    1.47{col 51}{space 3}0.143{col 59}{space 4}-12.31935{col 72}{space 3} 84.82406
{txt}{space 9}d_dist62 {c |}{col 19}{res}{space 2} 39.45944{col 31}{space 2} 3.080014{col 42}{space 1}   12.81{col 51}{space 3}0.000{col 59}{space 4} 33.39706{col 72}{space 3} 45.52181
{txt}{space 9}d_dist63 {c |}{col 19}{res}{space 2} 24.65989{col 31}{space 2} 2.946553{col 42}{space 1}    8.37{col 51}{space 3}0.000{col 59}{space 4} 18.86021{col 72}{space 3} 30.45957
{txt}{space 9}d_dist64 {c |}{col 19}{res}{space 2} 14.78097{col 31}{space 2} 2.970146{col 42}{space 1}    4.98{col 51}{space 3}0.000{col 59}{space 4} 8.934855{col 72}{space 3} 20.62709
{txt}{space 9}d_dist65 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 9}d_dist66 {c |}{col 19}{res}{space 2}-8.043246{col 31}{space 2} 2.873948{col 42}{space 1}   -2.80{col 51}{space 3}0.005{col 59}{space 4}-13.70002{col 72}{space 3}-2.386474
{txt}{space 9}d_dist67 {c |}{col 19}{res}{space 2}-5.521677{col 31}{space 2} 2.853807{col 42}{space 1}   -1.93{col 51}{space 3}0.054{col 59}{space 4}-11.13881{col 72}{space 3} .0954523
{txt}{space 9}d_dist68 {c |}{col 19}{res}{space 2} 12.64501{col 31}{space 2} 2.865331{col 42}{space 1}    4.41{col 51}{space 3}0.000{col 59}{space 4} 7.005203{col 72}{space 3} 18.28483
{txt}{space 9}d_dist69 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 9}d_dist70 {c |}{col 19}{res}{space 2}-4.202567{col 31}{space 2} .3988759{col 42}{space 1}  -10.54{col 51}{space 3}0.000{col 59}{space 4}-4.987672{col 72}{space 3}-3.417462
{txt}{space 9}d_dist71 {c |}{col 19}{res}{space 2}-35.54723{col 31}{space 2}  3.02031{col 42}{space 1}  -11.77{col 51}{space 3}0.000{col 59}{space 4}-41.49209{col 72}{space 3}-29.60237
{txt}{space 9}d_dist72 {c |}{col 19}{res}{space 2}-50.14928{col 31}{space 2} 3.070681{col 42}{space 1}  -16.33{col 51}{space 3}0.000{col 59}{space 4}-56.19328{col 72}{space 3}-44.10528
{txt}{space 9}d_dist73 {c |}{col 19}{res}{space 2} 7.022636{col 31}{space 2} .8077753{col 42}{space 1}    8.69{col 51}{space 3}0.000{col 59}{space 4} 5.432697{col 72}{space 3} 8.612574
{txt}{space 9}d_dist74 {c |}{col 19}{res}{space 2} 13.10662{col 31}{space 2} .8081278{col 42}{space 1}   16.22{col 51}{space 3}0.000{col 59}{space 4} 11.51599{col 72}{space 3} 14.69725
{txt}{space 9}d_dist75 {c |}{col 19}{res}{space 2}-1.785882{col 31}{space 2} .8081278{col 42}{space 1}   -2.21{col 51}{space 3}0.028{col 59}{space 4}-3.376514{col 72}{space 3}-.1952492
{txt}{space 9}d_dist76 {c |}{col 19}{res}{space 2} 8.689117{col 31}{space 2} .8081278{col 42}{space 1}   10.75{col 51}{space 3}0.000{col 59}{space 4} 7.098484{col 72}{space 3} 10.27975
{txt}{space 9}d_dist77 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 9}d_dist78 {c |}{col 19}{res}{space 2}-34.74875{col 31}{space 2}  .808277{col 42}{space 1}  -42.99{col 51}{space 3}0.000{col 59}{space 4}-36.33968{col 72}{space 3}-33.15782
{txt}{space 9}d_dist79 {c |}{col 19}{res}{space 2} 7.720691{col 31}{space 2} .8078777{col 42}{space 1}    9.56{col 51}{space 3}0.000{col 59}{space 4} 6.130551{col 72}{space 3} 9.310831
{txt}{space 9}d_dist80 {c |}{col 19}{res}{space 2}-24.63456{col 31}{space 2} .9470499{col 42}{space 1}  -26.01{col 51}{space 3}0.000{col 59}{space 4}-26.49863{col 72}{space 3}-22.77048
{txt}{space 9}d_dist81 {c |}{col 19}{res}{space 2}-3.878348{col 31}{space 2} .8134067{col 42}{space 1}   -4.77{col 51}{space 3}0.000{col 59}{space 4}-5.479371{col 72}{space 3}-2.277325
{txt}{space 9}d_dist82 {c |}{col 19}{res}{space 2}-33.25919{col 31}{space 2} .8281944{col 42}{space 1}  -40.16{col 51}{space 3}0.000{col 59}{space 4}-34.88932{col 72}{space 3}-31.62906
{txt}{space 9}d_dist83 {c |}{col 19}{res}{space 2}-31.34366{col 31}{space 2} 1.173654{col 42}{space 1}  -26.71{col 51}{space 3}0.000{col 59}{space 4}-33.65375{col 72}{space 3}-29.03356
{txt}{space 9}d_dist84 {c |}{col 19}{res}{space 2}-.7968553{col 31}{space 2} .8084328{col 42}{space 1}   -0.99{col 51}{space 3}0.325{col 59}{space 4}-2.388088{col 72}{space 3} .7943776
{txt}{space 9}d_dist85 {c |}{col 19}{res}{space 2}-38.24417{col 31}{space 2} .8089026{col 42}{space 1}  -47.28{col 51}{space 3}0.000{col 59}{space 4}-39.83633{col 72}{space 3}-36.65201
{txt}{space 9}d_dist86 {c |}{col 19}{res}{space 2}-35.07447{col 31}{space 2} 1.020275{col 42}{space 1}  -34.38{col 51}{space 3}0.000{col 59}{space 4}-37.08267{col 72}{space 3}-33.06627
{txt}{space 9}d_dist87 {c |}{col 19}{res}{space 2}-41.01121{col 31}{space 2} 1.176505{col 42}{space 1}  -34.86{col 51}{space 3}0.000{col 59}{space 4}-43.32692{col 72}{space 3}-38.69551
{txt}{space 9}d_dist88 {c |}{col 19}{res}{space 2}-44.91356{col 31}{space 2} .8732708{col 42}{space 1}  -51.43{col 51}{space 3}0.000{col 59}{space 4}-46.63242{col 72}{space 3}-43.19471
{txt}{space 9}d_dist89 {c |}{col 19}{res}{space 2}-12.70919{col 31}{space 2} .8970649{col 42}{space 1}  -14.17{col 51}{space 3}0.000{col 59}{space 4}-14.47488{col 72}{space 3} -10.9435
{txt}{space 9}d_dist90 {c |}{col 19}{res}{space 2}-46.63893{col 31}{space 2} .9565467{col 42}{space 1}  -48.76{col 51}{space 3}0.000{col 59}{space 4}-48.52169{col 72}{space 3}-44.75617
{txt}{space 9}d_dist91 {c |}{col 19}{res}{space 2}-44.60541{col 31}{space 2} .8149089{col 42}{space 1}  -54.74{col 51}{space 3}0.000{col 59}{space 4}-46.20939{col 72}{space 3}-43.00143
{txt}{space 9}d_dist92 {c |}{col 19}{res}{space 2} 29.06736{col 31}{space 2} .8099559{col 42}{space 1}   35.89{col 51}{space 3}0.000{col 59}{space 4} 27.47313{col 72}{space 3} 30.66159
{txt}{space 9}d_dist93 {c |}{col 19}{res}{space 2} 16.60343{col 31}{space 2} .0737752{col 42}{space 1}  225.05{col 51}{space 3}0.000{col 59}{space 4} 16.45822{col 72}{space 3} 16.74864
{txt}{space 9}d_dist94 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 9}d_dist95 {c |}{col 19}{res}{space 2} -4.69248{col 31}{space 2} .5309507{col 42}{space 1}   -8.84{col 51}{space 3}0.000{col 59}{space 4}-5.737547{col 72}{space 3}-3.647414
{txt}{space 9}d_dist96 {c |}{col 19}{res}{space 2}-7.579154{col 31}{space 2} .0051313{col 42}{space 1}-1477.05{col 51}{space 3}0.000{col 59}{space 4}-7.589254{col 72}{space 3}-7.569054
{txt}{space 9}d_dist97 {c |}{col 19}{res}{space 2}-3.856445{col 31}{space 2} .0539332{col 42}{space 1}  -71.50{col 51}{space 3}0.000{col 59}{space 4}-3.962601{col 72}{space 3}-3.750288
{txt}{space 9}d_dist98 {c |}{col 19}{res}{space 2} 21.66145{col 31}{space 2} .5248261{col 42}{space 1}   41.27{col 51}{space 3}0.000{col 59}{space 4} 20.62844{col 72}{space 3} 22.69446
{txt}{space 9}d_dist99 {c |}{col 19}{res}{space 2} 16.08404{col 31}{space 2} .7825725{col 42}{space 1}   20.55{col 51}{space 3}0.000{col 59}{space 4} 14.54371{col 72}{space 3} 17.62437
{txt}{space 8}d_dist100 {c |}{col 19}{res}{space 2} 16.37497{col 31}{space 2}  1.37087{col 42}{space 1}   11.94{col 51}{space 3}0.000{col 59}{space 4} 13.67669{col 72}{space 3} 19.07324
{txt}{space 8}d_dist101 {c |}{col 19}{res}{space 2}-77.51927{col 31}{space 2} 6.005709{col 42}{space 1}  -12.91{col 51}{space 3}0.000{col 59}{space 4}-89.34026{col 72}{space 3}-65.69827
{txt}{space 8}d_dist102 {c |}{col 19}{res}{space 2}-42.13417{col 31}{space 2} 5.181258{col 42}{space 1}   -8.13{col 51}{space 3}0.000{col 59}{space 4}-52.33241{col 72}{space 3}-31.93594
{txt}{space 8}d_dist103 {c |}{col 19}{res}{space 2} -29.9394{col 31}{space 2}  4.99668{col 42}{space 1}   -5.99{col 51}{space 3}0.000{col 59}{space 4}-39.77433{col 72}{space 3}-20.10446
{txt}{space 8}d_dist104 {c |}{col 19}{res}{space 2}-53.05201{col 31}{space 2} 5.396869{col 42}{space 1}   -9.83{col 51}{space 3}0.000{col 59}{space 4}-63.67463{col 72}{space 3}-42.42939
{txt}{space 8}d_dist105 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist106 {c |}{col 19}{res}{space 2} 32.88688{col 31}{space 2} .3462741{col 42}{space 1}   94.97{col 51}{space 3}0.000{col 59}{space 4} 32.20531{col 72}{space 3} 33.56845
{txt}{space 8}d_dist107 {c |}{col 19}{res}{space 2} 29.70327{col 31}{space 2} .5574742{col 42}{space 1}   53.28{col 51}{space 3}0.000{col 59}{space 4}   28.606{col 72}{space 3} 30.80055
{txt}{space 8}d_dist108 {c |}{col 19}{res}{space 2} 46.31824{col 31}{space 2} .4770231{col 42}{space 1}   97.10{col 51}{space 3}0.000{col 59}{space 4} 45.37931{col 72}{space 3} 47.25716
{txt}{space 8}d_dist109 {c |}{col 19}{res}{space 2}  41.8287{col 31}{space 2} .7209036{col 42}{space 1}   58.02{col 51}{space 3}0.000{col 59}{space 4} 40.40975{col 72}{space 3} 43.24765
{txt}{space 8}d_dist110 {c |}{col 19}{res}{space 2}-.7027005{col 31}{space 2} .2051022{col 42}{space 1}   -3.43{col 51}{space 3}0.001{col 59}{space 4}-1.106402{col 72}{space 3}-.2989993
{txt}{space 8}d_dist111 {c |}{col 19}{res}{space 2} 46.68107{col 31}{space 2} .4085774{col 42}{space 1}  114.25{col 51}{space 3}0.000{col 59}{space 4} 45.87687{col 72}{space 3} 47.48527
{txt}{space 8}d_dist112 {c |}{col 19}{res}{space 2} 39.23626{col 31}{space 2} .1744734{col 42}{space 1}  224.88{col 51}{space 3}0.000{col 59}{space 4} 38.89285{col 72}{space 3} 39.57968
{txt}{space 8}d_dist113 {c |}{col 19}{res}{space 2} 2.942367{col 31}{space 2} .0957259{col 42}{space 1}   30.74{col 51}{space 3}0.000{col 59}{space 4}  2.75395{col 72}{space 3} 3.130783
{txt}{space 8}d_dist114 {c |}{col 19}{res}{space 2} 8.173046{col 31}{space 2} .1321516{col 42}{space 1}   61.85{col 51}{space 3}0.000{col 59}{space 4} 7.912933{col 72}{space 3} 8.433159
{txt}{space 8}d_dist115 {c |}{col 19}{res}{space 2}  .332241{col 31}{space 2} .5498115{col 42}{space 1}    0.60{col 51}{space 3}0.546{col 59}{space 4}-.7499492{col 72}{space 3} 1.414431
{txt}{space 8}d_dist116 {c |}{col 19}{res}{space 2} .0442345{col 31}{space 2} .5409094{col 42}{space 1}    0.08{col 51}{space 3}0.935{col 59}{space 4}-1.020434{col 72}{space 3} 1.108903
{txt}{space 8}d_dist117 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist118 {c |}{col 19}{res}{space 2}-16.11925{col 31}{space 2}  .947009{col 42}{space 1}  -17.02{col 51}{space 3}0.000{col 59}{space 4}-17.98324{col 72}{space 3}-14.25525
{txt}{space 8}d_dist119 {c |}{col 19}{res}{space 2}-2.252892{col 31}{space 2} .5584053{col 42}{space 1}   -4.03{col 51}{space 3}0.000{col 59}{space 4}-3.351997{col 72}{space 3}-1.153786
{txt}{space 8}d_dist120 {c |}{col 19}{res}{space 2} 18.55295{col 31}{space 2} .2597728{col 42}{space 1}   71.42{col 51}{space 3}0.000{col 59}{space 4} 18.04164{col 72}{space 3} 19.06426
{txt}{space 8}d_dist121 {c |}{col 19}{res}{space 2} 5.446058{col 31}{space 2}  .620275{col 42}{space 1}    8.78{col 51}{space 3}0.000{col 59}{space 4} 4.225175{col 72}{space 3} 6.666941
{txt}{space 8}d_dist122 {c |}{col 19}{res}{space 2}-13.55672{col 31}{space 2} 2.077917{col 42}{space 1}   -6.52{col 51}{space 3}0.000{col 59}{space 4}-17.64667{col 72}{space 3}-9.466767
{txt}{space 8}d_dist123 {c |}{col 19}{res}{space 2} 33.64618{col 31}{space 2} .5603384{col 42}{space 1}   60.05{col 51}{space 3}0.000{col 59}{space 4} 32.54327{col 72}{space 3} 34.74909
{txt}{space 8}d_dist124 {c |}{col 19}{res}{space 2} 3.755159{col 31}{space 2} .4293526{col 42}{space 1}    8.75{col 51}{space 3}0.000{col 59}{space 4} 2.910068{col 72}{space 3} 4.600251
{txt}{space 8}d_dist125 {c |}{col 19}{res}{space 2}   6.6544{col 31}{space 2} .3294036{col 42}{space 1}   20.20{col 51}{space 3}0.000{col 59}{space 4} 6.006037{col 72}{space 3} 7.302762
{txt}{space 8}d_dist126 {c |}{col 19}{res}{space 2} 6.339092{col 31}{space 2} .3173487{col 42}{space 1}   19.98{col 51}{space 3}0.000{col 59}{space 4} 5.714456{col 72}{space 3} 6.963727
{txt}{space 8}d_dist127 {c |}{col 19}{res}{space 2} 37.82453{col 31}{space 2} .2173676{col 42}{space 1}  174.01{col 51}{space 3}0.000{col 59}{space 4} 37.39668{col 72}{space 3} 38.25237
{txt}{space 8}d_dist128 {c |}{col 19}{res}{space 2} 7.360731{col 31}{space 2} .2634382{col 42}{space 1}   27.94{col 51}{space 3}0.000{col 59}{space 4} 6.842207{col 72}{space 3} 7.879254
{txt}{space 8}d_dist129 {c |}{col 19}{res}{space 2} 17.22371{col 31}{space 2} .3309506{col 42}{space 1}   52.04{col 51}{space 3}0.000{col 59}{space 4} 16.57231{col 72}{space 3} 17.87512
{txt}{space 8}d_dist130 {c |}{col 19}{res}{space 2} 10.37625{col 31}{space 2} .3116676{col 42}{space 1}   33.29{col 51}{space 3}0.000{col 59}{space 4} 9.762801{col 72}{space 3} 10.98971
{txt}{space 8}d_dist131 {c |}{col 19}{res}{space 2} 19.80267{col 31}{space 2} .4698308{col 42}{space 1}   42.15{col 51}{space 3}0.000{col 59}{space 4}  18.8779{col 72}{space 3} 20.72743
{txt}{space 8}d_dist132 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist133 {c |}{col 19}{res}{space 2} 14.43016{col 31}{space 2} .4698308{col 42}{space 1}   30.71{col 51}{space 3}0.000{col 59}{space 4}  13.5054{col 72}{space 3} 15.35493
{txt}{space 8}d_dist134 {c |}{col 19}{res}{space 2} 41.84516{col 31}{space 2} .4698308{col 42}{space 1}   89.06{col 51}{space 3}0.000{col 59}{space 4}  40.9204{col 72}{space 3} 42.76993
{txt}{space 8}d_dist135 {c |}{col 19}{res}{space 2} 56.64556{col 31}{space 2} .4418531{col 42}{space 1}  128.20{col 51}{space 3}0.000{col 59}{space 4} 55.77586{col 72}{space 3} 57.51525
{txt}{space 8}d_dist136 {c |}{col 19}{res}{space 2} 58.98517{col 31}{space 2} .4698308{col 42}{space 1}  125.55{col 51}{space 3}0.000{col 59}{space 4}  58.0604{col 72}{space 3} 59.90993
{txt}{space 8}d_dist137 {c |}{col 19}{res}{space 2} 47.37623{col 31}{space 2} .3605378{col 42}{space 1}  131.40{col 51}{space 3}0.000{col 59}{space 4} 46.66659{col 72}{space 3} 48.08588
{txt}{space 8}d_dist138 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist139 {c |}{col 19}{res}{space 2}-5.545568{col 31}{space 2} 4.031317{col 42}{space 1}   -1.38{col 51}{space 3}0.170{col 59}{space 4}-13.48038{col 72}{space 3} 2.389245
{txt}{space 8}d_dist140 {c |}{col 19}{res}{space 2} -6.50086{col 31}{space 2} 3.951027{col 42}{space 1}   -1.65{col 51}{space 3}0.101{col 59}{space 4}-14.27764{col 72}{space 3} 1.275919
{txt}{space 8}d_dist141 {c |}{col 19}{res}{space 2} 21.98385{col 31}{space 2} 3.926644{col 42}{space 1}    5.60{col 51}{space 3}0.000{col 59}{space 4} 14.25506{col 72}{space 3} 29.71263
{txt}{space 8}d_dist142 {c |}{col 19}{res}{space 2} 30.90743{col 31}{space 2} 3.953244{col 42}{space 1}    7.82{col 51}{space 3}0.000{col 59}{space 4} 23.12629{col 72}{space 3} 38.68858
{txt}{space 8}d_dist143 {c |}{col 19}{res}{space 2}-.4739559{col 31}{space 2} 4.041975{col 42}{space 1}   -0.12{col 51}{space 3}0.907{col 59}{space 4}-8.429748{col 72}{space 3} 7.481836
{txt}{space 8}d_dist144 {c |}{col 19}{res}{space 2} 17.43441{col 31}{space 2} 2.294886{col 42}{space 1}    7.60{col 51}{space 3}0.000{col 59}{space 4}  12.9174{col 72}{space 3} 21.95142
{txt}{space 8}d_dist145 {c |}{col 19}{res}{space 2} 18.05409{col 31}{space 2} 3.900478{col 42}{space 1}    4.63{col 51}{space 3}0.000{col 59}{space 4} 10.37681{col 72}{space 3} 25.73138
{txt}{space 8}d_dist146 {c |}{col 19}{res}{space 2} 47.55679{col 31}{space 2} .4340059{col 42}{space 1}  109.58{col 51}{space 3}0.000{col 59}{space 4} 46.70254{col 72}{space 3} 48.41104
{txt}{space 8}d_dist147 {c |}{col 19}{res}{space 2} .7212998{col 31}{space 2} .5571326{col 42}{space 1}    1.29{col 51}{space 3}0.196{col 59}{space 4}-.3753006{col 72}{space 3}   1.8179
{txt}{space 8}d_dist148 {c |}{col 19}{res}{space 2} 27.75799{col 31}{space 2} .9497317{col 42}{space 1}   29.23{col 51}{space 3}0.000{col 59}{space 4} 25.88864{col 72}{space 3} 29.62734
{txt}{space 8}d_dist149 {c |}{col 19}{res}{space 2}  28.7408{col 31}{space 2} .5069389{col 42}{space 1}   56.69{col 51}{space 3}0.000{col 59}{space 4} 27.74299{col 72}{space 3}  29.7386
{txt}{space 8}d_dist150 {c |}{col 19}{res}{space 2} 25.95598{col 31}{space 2} .4558273{col 42}{space 1}   56.94{col 51}{space 3}0.000{col 59}{space 4} 25.05878{col 72}{space 3} 26.85318
{txt}{space 8}d_dist151 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist152 {c |}{col 19}{res}{space 2}-3.285998{col 31}{space 2} .5327141{col 42}{space 1}   -6.17{col 51}{space 3}0.000{col 59}{space 4}-4.334536{col 72}{space 3}-2.237461
{txt}{space 8}d_dist153 {c |}{col 19}{res}{space 2}-4.869332{col 31}{space 2} .8944339{col 42}{space 1}   -5.44{col 51}{space 3}0.000{col 59}{space 4} -6.62984{col 72}{space 3}-3.108823
{txt}{space 8}d_dist154 {c |}{col 19}{res}{space 2}-3.471399{col 31}{space 2} .5896905{col 42}{space 1}   -5.89{col 51}{space 3}0.000{col 59}{space 4}-4.632083{col 72}{space 3}-2.310715
{txt}{space 8}d_dist155 {c |}{col 19}{res}{space 2}-6.581357{col 31}{space 2} 5.078489{col 42}{space 1}   -1.30{col 51}{space 3}0.196{col 59}{space 4}-16.57731{col 72}{space 3} 3.414599
{txt}{space 8}d_dist156 {c |}{col 19}{res}{space 2}-35.40496{col 31}{space 2} 5.043088{col 42}{space 1}   -7.02{col 51}{space 3}0.000{col 59}{space 4}-45.33123{col 72}{space 3}-25.47868
{txt}{space 8}d_dist157 {c |}{col 19}{res}{space 2}-26.57081{col 31}{space 2} 4.651563{col 42}{space 1}   -5.71{col 51}{space 3}0.000{col 59}{space 4}-35.72645{col 72}{space 3}-17.41517
{txt}{space 8}d_dist158 {c |}{col 19}{res}{space 2}-31.78315{col 31}{space 2} .7510324{col 42}{space 1}  -42.32{col 51}{space 3}0.000{col 59}{space 4} -33.2614{col 72}{space 3} -30.3049
{txt}{space 8}d_dist159 {c |}{col 19}{res}{space 2}-28.44169{col 31}{space 2} .6099497{col 42}{space 1}  -46.63{col 51}{space 3}0.000{col 59}{space 4}-29.64225{col 72}{space 3}-27.24113
{txt}{space 8}d_dist160 {c |}{col 19}{res}{space 2} 7.824259{col 31}{space 2} .5716513{col 42}{space 1}   13.69{col 51}{space 3}0.000{col 59}{space 4} 6.699081{col 72}{space 3} 8.949436
{txt}{space 8}d_dist161 {c |}{col 19}{res}{space 2}-35.09811{col 31}{space 2}  .587395{col 42}{space 1}  -59.75{col 51}{space 3}0.000{col 59}{space 4}-36.25428{col 72}{space 3}-33.94194
{txt}{space 8}d_dist162 {c |}{col 19}{res}{space 2}-26.38914{col 31}{space 2} .6631548{col 42}{space 1}  -39.79{col 51}{space 3}0.000{col 59}{space 4}-27.69442{col 72}{space 3}-25.08386
{txt}{space 8}d_dist163 {c |}{col 19}{res}{space 2}-38.44551{col 31}{space 2} .5076718{col 42}{space 1}  -75.73{col 51}{space 3}0.000{col 59}{space 4}-39.44476{col 72}{space 3}-37.44627
{txt}{space 8}d_dist164 {c |}{col 19}{res}{space 2}-28.79285{col 31}{space 2} .0805986{col 42}{space 1} -357.24{col 51}{space 3}0.000{col 59}{space 4}-28.95149{col 72}{space 3}-28.63421
{txt}{space 8}d_dist165 {c |}{col 19}{res}{space 2} -5.59407{col 31}{space 2}  .769575{col 42}{space 1}   -7.27{col 51}{space 3}0.000{col 59}{space 4}-7.108819{col 72}{space 3}-4.079321
{txt}{space 8}d_dist166 {c |}{col 19}{res}{space 2}-24.98048{col 31}{space 2} .0593689{col 42}{space 1} -420.77{col 51}{space 3}0.000{col 59}{space 4}-25.09734{col 72}{space 3}-24.86363
{txt}{space 8}d_dist167 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist168 {c |}{col 19}{res}{space 2}-1.778427{col 31}{space 2} .0205473{col 42}{space 1}  -86.55{col 51}{space 3}0.000{col 59}{space 4}-1.818871{col 72}{space 3}-1.737984
{txt}{space 8}d_dist169 {c |}{col 19}{res}{space 2} 26.38625{col 31}{space 2} .4879146{col 42}{space 1}   54.08{col 51}{space 3}0.000{col 59}{space 4} 25.42589{col 72}{space 3} 27.34661
{txt}{space 8}d_dist170 {c |}{col 19}{res}{space 2} -35.1189{col 31}{space 2} .0444291{col 42}{space 1} -790.45{col 51}{space 3}0.000{col 59}{space 4}-35.20635{col 72}{space 3}-35.03146
{txt}{space 8}d_dist171 {c |}{col 19}{res}{space 2}-9.348739{col 31}{space 2} .4098417{col 42}{space 1}  -22.81{col 51}{space 3}0.000{col 59}{space 4}-10.15543{col 72}{space 3}-8.542051
{txt}{space 8}d_dist172 {c |}{col 19}{res}{space 2} 7.216997{col 31}{space 2} .6176682{col 42}{space 1}   11.68{col 51}{space 3}0.000{col 59}{space 4} 6.001245{col 72}{space 3} 8.432749
{txt}{space 8}d_dist173 {c |}{col 19}{res}{space 2} 11.93615{col 31}{space 2} .9819847{col 42}{space 1}   12.16{col 51}{space 3}0.000{col 59}{space 4} 10.00332{col 72}{space 3} 13.86899
{txt}{space 8}d_dist174 {c |}{col 19}{res}{space 2} 21.46317{col 31}{space 2} .6522145{col 42}{space 1}   32.91{col 51}{space 3}0.000{col 59}{space 4} 20.17942{col 72}{space 3} 22.74692
{txt}{space 8}d_dist175 {c |}{col 19}{res}{space 2}-7.366097{col 31}{space 2} .6380917{col 42}{space 1}  -11.54{col 51}{space 3}0.000{col 59}{space 4}-8.622049{col 72}{space 3}-6.110146
{txt}{space 8}d_dist176 {c |}{col 19}{res}{space 2} 18.00197{col 31}{space 2} .6021018{col 42}{space 1}   29.90{col 51}{space 3}0.000{col 59}{space 4} 16.81686{col 72}{space 3} 19.18708
{txt}{space 8}d_dist177 {c |}{col 19}{res}{space 2} 34.03133{col 31}{space 2} .6035111{col 42}{space 1}   56.39{col 51}{space 3}0.000{col 59}{space 4} 32.84345{col 72}{space 3} 35.21922
{txt}{space 8}d_dist178 {c |}{col 19}{res}{space 2} 53.89496{col 31}{space 2} .5943659{col 42}{space 1}   90.68{col 51}{space 3}0.000{col 59}{space 4} 52.72507{col 72}{space 3} 55.06484
{txt}{space 8}d_dist179 {c |}{col 19}{res}{space 2} 41.52247{col 31}{space 2} 1.076349{col 42}{space 1}   38.58{col 51}{space 3}0.000{col 59}{space 4} 39.40389{col 72}{space 3} 43.64104
{txt}{space 8}d_dist180 {c |}{col 19}{res}{space 2} 38.30143{col 31}{space 2} .6989394{col 42}{space 1}   54.80{col 51}{space 3}0.000{col 59}{space 4} 36.92571{col 72}{space 3} 39.67715
{txt}{space 8}d_dist181 {c |}{col 19}{res}{space 2} 39.97601{col 31}{space 2} .5940642{col 42}{space 1}   67.29{col 51}{space 3}0.000{col 59}{space 4} 38.80672{col 72}{space 3}  41.1453
{txt}{space 8}d_dist182 {c |}{col 19}{res}{space 2} 51.10298{col 31}{space 2} .7324334{col 42}{space 1}   69.77{col 51}{space 3}0.000{col 59}{space 4} 49.66133{col 72}{space 3} 52.54462
{txt}{space 8}d_dist183 {c |}{col 19}{res}{space 2} 50.94872{col 31}{space 2} .5927443{col 42}{space 1}   85.95{col 51}{space 3}0.000{col 59}{space 4} 49.78202{col 72}{space 3} 52.11541
{txt}{space 8}d_dist184 {c |}{col 19}{res}{space 2} 49.34723{col 31}{space 2} .7609712{col 42}{space 1}   64.85{col 51}{space 3}0.000{col 59}{space 4} 47.84941{col 72}{space 3} 50.84504
{txt}{space 8}d_dist185 {c |}{col 19}{res}{space 2} 7.322222{col 31}{space 2} .8138295{col 42}{space 1}    9.00{col 51}{space 3}0.000{col 59}{space 4} 5.720367{col 72}{space 3} 8.924077
{txt}{space 8}d_dist186 {c |}{col 19}{res}{space 2}  39.9603{col 31}{space 2} 1.222268{col 42}{space 1}   32.69{col 51}{space 3}0.000{col 59}{space 4} 37.55452{col 72}{space 3} 42.36608
{txt}{space 8}d_dist187 {c |}{col 19}{res}{space 2}  50.9553{col 31}{space 2} 1.222268{col 42}{space 1}   41.69{col 51}{space 3}0.000{col 59}{space 4} 48.54952{col 72}{space 3} 53.36108
{txt}{space 8}d_dist188 {c |}{col 19}{res}{space 2}  54.8203{col 31}{space 2} 1.222268{col 42}{space 1}   44.85{col 51}{space 3}0.000{col 59}{space 4} 52.41452{col 72}{space 3} 57.22608
{txt}{space 8}d_dist189 {c |}{col 19}{res}{space 2} 36.31065{col 31}{space 2} 1.086516{col 42}{space 1}   33.42{col 51}{space 3}0.000{col 59}{space 4} 34.17207{col 72}{space 3} 38.44924
{txt}{space 8}d_dist190 {c |}{col 19}{res}{space 2} 26.21871{col 31}{space 2} .9577938{col 42}{space 1}   27.37{col 51}{space 3}0.000{col 59}{space 4} 24.33349{col 72}{space 3} 28.10392
{txt}{space 8}d_dist191 {c |}{col 19}{res}{space 2} 5.814028{col 31}{space 2} .8698131{col 42}{space 1}    6.68{col 51}{space 3}0.000{col 59}{space 4} 4.101981{col 72}{space 3} 7.526076
{txt}{space 8}d_dist192 {c |}{col 19}{res}{space 2} 2.900649{col 31}{space 2} .8972001{col 42}{space 1}    3.23{col 51}{space 3}0.001{col 59}{space 4} 1.134696{col 72}{space 3} 4.666602
{txt}{space 8}d_dist193 {c |}{col 19}{res}{space 2}  25.4869{col 31}{space 2} .6543261{col 42}{space 1}   38.95{col 51}{space 3}0.000{col 59}{space 4}   24.199{col 72}{space 3} 26.77481
{txt}{space 8}d_dist194 {c |}{col 19}{res}{space 2} 30.20576{col 31}{space 2} 1.033612{col 42}{space 1}   29.22{col 51}{space 3}0.000{col 59}{space 4} 28.17131{col 72}{space 3} 32.24021
{txt}{space 8}d_dist195 {c |}{col 19}{res}{space 2}-6.632935{col 31}{space 2} 1.615884{col 42}{space 1}   -4.10{col 51}{space 3}0.000{col 59}{space 4}-9.813469{col 72}{space 3}-3.452401
{txt}{space 8}d_dist196 {c |}{col 19}{res}{space 2} 5.791036{col 31}{space 2} .8452778{col 42}{space 1}    6.85{col 51}{space 3}0.000{col 59}{space 4} 4.127282{col 72}{space 3} 7.454791
{txt}{space 8}d_dist197 {c |}{col 19}{res}{space 2}-4.008248{col 31}{space 2} .6002674{col 42}{space 1}   -6.68{col 51}{space 3}0.000{col 59}{space 4} -5.18975{col 72}{space 3}-2.826746
{txt}{space 8}d_dist198 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist199 {c |}{col 19}{res}{space 2} 23.31716{col 31}{space 2} .6272339{col 42}{space 1}   37.17{col 51}{space 3}0.000{col 59}{space 4} 22.08257{col 72}{space 3} 24.55174
{txt}{space 8}d_dist200 {c |}{col 19}{res}{space 2} 28.08234{col 31}{space 2} .8980939{col 42}{space 1}   31.27{col 51}{space 3}0.000{col 59}{space 4} 26.31463{col 72}{space 3} 29.85005
{txt}{space 8}d_dist201 {c |}{col 19}{res}{space 2}  4.43537{col 31}{space 2} .7034203{col 42}{space 1}    6.31{col 51}{space 3}0.000{col 59}{space 4} 3.050832{col 72}{space 3} 5.819907
{txt}{space 8}d_dist202 {c |}{col 19}{res}{space 2} 40.32595{col 31}{space 2} .1746064{col 42}{space 1}  230.95{col 51}{space 3}0.000{col 59}{space 4} 39.98228{col 72}{space 3} 40.66963
{txt}{space 8}d_dist203 {c |}{col 19}{res}{space 2} 28.86105{col 31}{space 2} .0409019{col 42}{space 1}  705.62{col 51}{space 3}0.000{col 59}{space 4} 28.78054{col 72}{space 3} 28.94156
{txt}{space 8}d_dist204 {c |}{col 19}{res}{space 2}-3.930607{col 31}{space 2} .7182569{col 42}{space 1}   -5.47{col 51}{space 3}0.000{col 59}{space 4}-5.344347{col 72}{space 3}-2.516866
{txt}{space 8}d_dist205 {c |}{col 19}{res}{space 2}  29.6975{col 31}{space 2} 1.19e-07{col 42}{space 1} 2.5e+08{col 51}{space 3}0.000{col 59}{space 4}  29.6975{col 72}{space 3}  29.6975
{txt}{space 8}d_dist206 {c |}{col 19}{res}{space 2} 6.885278{col 31}{space 2} .1665788{col 42}{space 1}   41.33{col 51}{space 3}0.000{col 59}{space 4} 6.557402{col 72}{space 3} 7.213154
{txt}{space 8}d_dist207 {c |}{col 19}{res}{space 2}-4.255874{col 31}{space 2} .0051447{col 42}{space 1} -827.24{col 51}{space 3}0.000{col 59}{space 4}   -4.266{col 72}{space 3}-4.245747
{txt}{space 8}d_dist208 {c |}{col 19}{res}{space 2} 34.07506{col 31}{space 2} .1679315{col 42}{space 1}  202.91{col 51}{space 3}0.000{col 59}{space 4} 33.74452{col 72}{space 3}  34.4056
{txt}{space 8}d_dist209 {c |}{col 19}{res}{space 2} 18.33616{col 31}{space 2} .0467623{col 42}{space 1}  392.11{col 51}{space 3}0.000{col 59}{space 4} 18.24412{col 72}{space 3} 18.42821
{txt}{space 8}d_dist210 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist211 {c |}{col 19}{res}{space 2}  3.34887{col 31}{space 2} .1341927{col 42}{space 1}   24.96{col 51}{space 3}0.000{col 59}{space 4}  3.08474{col 72}{space 3} 3.613001
{txt}{space 8}d_dist212 {c |}{col 19}{res}{space 2} 20.48962{col 31}{space 2} .4543826{col 42}{space 1}   45.09{col 51}{space 3}0.000{col 59}{space 4} 19.59526{col 72}{space 3} 21.38398
{txt}{space 8}d_dist213 {c |}{col 19}{res}{space 2} 34.92072{col 31}{space 2} .0114854{col 42}{space 1} 3040.45{col 51}{space 3}0.000{col 59}{space 4} 34.89812{col 72}{space 3} 34.94333
{txt}{space 8}d_dist214 {c |}{col 19}{res}{space 2} 28.26507{col 31}{space 2} .0094287{col 42}{space 1} 2997.77{col 51}{space 3}0.000{col 59}{space 4} 28.24651{col 72}{space 3} 28.28363
{txt}{space 8}d_dist215 {c |}{col 19}{res}{space 2}-21.94724{col 31}{space 2} .0495529{col 42}{space 1} -442.91{col 51}{space 3}0.000{col 59}{space 4}-22.04477{col 72}{space 3} -21.8497
{txt}{space 8}d_dist216 {c |}{col 19}{res}{space 2}-28.68685{col 31}{space 2} .0387242{col 42}{space 1} -740.80{col 51}{space 3}0.000{col 59}{space 4}-28.76307{col 72}{space 3}-28.61063
{txt}{space 8}d_dist217 {c |}{col 19}{res}{space 2}-33.19201{col 31}{space 2} .6609601{col 42}{space 1}  -50.22{col 51}{space 3}0.000{col 59}{space 4}-34.49297{col 72}{space 3}-31.89104
{txt}{space 8}d_dist218 {c |}{col 19}{res}{space 2}-35.99095{col 31}{space 2} 1.294109{col 42}{space 1}  -27.81{col 51}{space 3}0.000{col 59}{space 4}-38.53814{col 72}{space 3}-33.44377
{txt}{space 8}d_dist219 {c |}{col 19}{res}{space 2}-36.38696{col 31}{space 2} 1.246641{col 42}{space 1}  -29.19{col 51}{space 3}0.000{col 59}{space 4}-38.84072{col 72}{space 3}-33.93321
{txt}{space 8}d_dist220 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist221 {c |}{col 19}{res}{space 2}-32.83796{col 31}{space 2} .8021658{col 42}{space 1}  -40.94{col 51}{space 3}0.000{col 59}{space 4}-34.41685{col 72}{space 3}-31.25906
{txt}{space 8}d_dist222 {c |}{col 19}{res}{space 2}-38.32312{col 31}{space 2} 1.093217{col 42}{space 1}  -35.06{col 51}{space 3}0.000{col 59}{space 4} -40.4749{col 72}{space 3}-36.17135
{txt}{space 8}d_dist223 {c |}{col 19}{res}{space 2}-2.981171{col 31}{space 2} 1.475455{col 42}{space 1}   -2.02{col 51}{space 3}0.044{col 59}{space 4}-5.885299{col 72}{space 3} -.077043
{txt}{space 8}d_dist224 {c |}{col 19}{res}{space 2}-9.536704{col 31}{space 2} .9222214{col 42}{space 1}  -10.34{col 51}{space 3}0.000{col 59}{space 4}-11.35191{col 72}{space 3}-7.721502
{txt}{space 8}d_dist225 {c |}{col 19}{res}{space 2} 17.02006{col 31}{space 2} 1.019353{col 42}{space 1}   16.70{col 51}{space 3}0.000{col 59}{space 4} 15.01367{col 72}{space 3} 19.02644
{txt}{space 8}d_dist226 {c |}{col 19}{res}{space 2}-28.77639{col 31}{space 2} .8061577{col 42}{space 1}  -35.70{col 51}{space 3}0.000{col 59}{space 4}-30.36315{col 72}{space 3}-27.18964
{txt}{space 8}d_dist227 {c |}{col 19}{res}{space 2}-8.001645{col 31}{space 2} .7293224{col 42}{space 1}  -10.97{col 51}{space 3}0.000{col 59}{space 4}-9.437165{col 72}{space 3}-6.566125
{txt}{space 8}d_dist228 {c |}{col 19}{res}{space 2} -33.1351{col 31}{space 2} .9249382{col 42}{space 1}  -35.82{col 51}{space 3}0.000{col 59}{space 4}-34.95565{col 72}{space 3}-31.31455
{txt}{space 8}d_dist229 {c |}{col 19}{res}{space 2} -25.0863{col 31}{space 2} 1.046223{col 42}{space 1}  -23.98{col 51}{space 3}0.000{col 59}{space 4}-27.14557{col 72}{space 3}-23.02702
{txt}{space 8}d_dist230 {c |}{col 19}{res}{space 2}-26.73451{col 31}{space 2} .7910732{col 42}{space 1}  -33.80{col 51}{space 3}0.000{col 59}{space 4}-28.29158{col 72}{space 3}-25.17745
{txt}{space 8}d_dist231 {c |}{col 19}{res}{space 2}  5.43624{col 31}{space 2} .3672694{col 42}{space 1}   14.80{col 51}{space 3}0.000{col 59}{space 4} 4.713346{col 72}{space 3} 6.159134
{txt}{space 8}d_dist232 {c |}{col 19}{res}{space 2}-19.38028{col 31}{space 2} .1515343{col 42}{space 1} -127.89{col 51}{space 3}0.000{col 59}{space 4}-19.67855{col 72}{space 3}-19.08202
{txt}{space 8}d_dist233 {c |}{col 19}{res}{space 2}-41.50976{col 31}{space 2} .6303292{col 42}{space 1}  -65.85{col 51}{space 3}0.000{col 59}{space 4}-42.75043{col 72}{space 3}-40.26909
{txt}{space 8}d_dist234 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist235 {c |}{col 19}{res}{space 2}-53.70772{col 31}{space 2} 2.534809{col 42}{space 1}  -21.19{col 51}{space 3}0.000{col 59}{space 4}-58.69697{col 72}{space 3}-48.71847
{txt}{space 8}d_dist236 {c |}{col 19}{res}{space 2}-52.42066{col 31}{space 2} .9463454{col 42}{space 1}  -55.39{col 51}{space 3}0.000{col 59}{space 4}-54.28334{col 72}{space 3}-50.55797
{txt}{space 8}d_dist237 {c |}{col 19}{res}{space 2} -31.8895{col 31}{space 2} .4433208{col 42}{space 1}  -71.93{col 51}{space 3}0.000{col 59}{space 4}-32.76209{col 72}{space 3}-31.01692
{txt}{space 8}d_dist238 {c |}{col 19}{res}{space 2} 48.75833{col 31}{space 2} 4.117287{col 42}{space 1}   11.84{col 51}{space 3}0.000{col 59}{space 4}  40.6543{col 72}{space 3} 56.86235
{txt}{space 8}d_dist239 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist240 {c |}{col 19}{res}{space 2} 53.27367{col 31}{space 2} 4.221835{col 42}{space 1}   12.62{col 51}{space 3}0.000{col 59}{space 4} 44.96386{col 72}{space 3} 61.58348
{txt}{space 8}d_dist241 {c |}{col 19}{res}{space 2} 48.17945{col 31}{space 2} 4.125513{col 42}{space 1}   11.68{col 51}{space 3}0.000{col 59}{space 4} 40.05923{col 72}{space 3} 56.29967
{txt}{space 8}d_dist242 {c |}{col 19}{res}{space 2} 32.95857{col 31}{space 2} 4.215294{col 42}{space 1}    7.82{col 51}{space 3}0.000{col 59}{space 4} 24.66163{col 72}{space 3}  41.2555
{txt}{space 8}d_dist243 {c |}{col 19}{res}{space 2} 4.623296{col 31}{space 2}   .23737{col 42}{space 1}   19.48{col 51}{space 3}0.000{col 59}{space 4} 4.156082{col 72}{space 3} 5.090509
{txt}{space 8}d_dist244 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist245 {c |}{col 19}{res}{space 2}-45.66444{col 31}{space 2} .6171639{col 42}{space 1}  -73.99{col 51}{space 3}0.000{col 59}{space 4} -46.8792{col 72}{space 3}-44.44968
{txt}{space 8}d_dist246 {c |}{col 19}{res}{space 2}-40.78365{col 31}{space 2} .1389331{col 42}{space 1} -293.55{col 51}{space 3}0.000{col 59}{space 4}-41.05711{col 72}{space 3}-40.51019
{txt}{space 8}d_dist247 {c |}{col 19}{res}{space 2}-62.48228{col 31}{space 2}  .454705{col 42}{space 1} -137.41{col 51}{space 3}0.000{col 59}{space 4}-63.37728{col 72}{space 3}-61.58729
{txt}{space 8}d_dist248 {c |}{col 19}{res}{space 2}-42.91715{col 31}{space 2} .4694156{col 42}{space 1}  -91.43{col 51}{space 3}0.000{col 59}{space 4} -43.8411{col 72}{space 3}-41.99321
{txt}{space 8}d_dist249 {c |}{col 19}{res}{space 2}-39.66412{col 31}{space 2} .3496984{col 42}{space 1} -113.42{col 51}{space 3}0.000{col 59}{space 4}-40.35243{col 72}{space 3}-38.97581
{txt}{space 8}d_dist250 {c |}{col 19}{res}{space 2}-40.25883{col 31}{space 2}  .305794{col 42}{space 1} -131.65{col 51}{space 3}0.000{col 59}{space 4}-40.86072{col 72}{space 3}-39.65693
{txt}{space 8}d_dist251 {c |}{col 19}{res}{space 2}-57.76602{col 31}{space 2} .6335461{col 42}{space 1}  -91.18{col 51}{space 3}0.000{col 59}{space 4}-59.01303{col 72}{space 3}-56.51902
{txt}{space 8}d_dist252 {c |}{col 19}{res}{space 2}-51.83298{col 31}{space 2} .3924665{col 42}{space 1} -132.07{col 51}{space 3}0.000{col 59}{space 4}-52.60547{col 72}{space 3}-51.06049
{txt}{space 8}d_dist253 {c |}{col 19}{res}{space 2}-22.75859{col 31}{space 2}  .378681{col 42}{space 1}  -60.10{col 51}{space 3}0.000{col 59}{space 4}-23.50394{col 72}{space 3}-22.01323
{txt}{space 8}d_dist254 {c |}{col 19}{res}{space 2}-23.06699{col 31}{space 2} .4482083{col 42}{space 1}  -51.46{col 51}{space 3}0.000{col 59}{space 4} -23.9492{col 72}{space 3}-22.18478
{txt}{space 8}d_dist255 {c |}{col 19}{res}{space 2}-28.66769{col 31}{space 2} .2697696{col 42}{space 1} -106.27{col 51}{space 3}0.000{col 59}{space 4}-29.19867{col 72}{space 3} -28.1367
{txt}{space 8}d_dist256 {c |}{col 19}{res}{space 2} 2.985071{col 31}{space 2}  .256638{col 42}{space 1}   11.63{col 51}{space 3}0.000{col 59}{space 4} 2.479932{col 72}{space 3}  3.49021
{txt}{space 8}d_dist257 {c |}{col 19}{res}{space 2}-47.84888{col 31}{space 2} .3708723{col 42}{space 1} -129.02{col 51}{space 3}0.000{col 59}{space 4}-48.57886{col 72}{space 3}-47.11889
{txt}{space 8}d_dist258 {c |}{col 19}{res}{space 2}-53.09072{col 31}{space 2} .8933687{col 42}{space 1}  -59.43{col 51}{space 3}0.000{col 59}{space 4}-54.84913{col 72}{space 3}-51.33231
{txt}{space 8}d_dist259 {c |}{col 19}{res}{space 2}-29.46828{col 31}{space 2} .5136461{col 42}{space 1}  -57.37{col 51}{space 3}0.000{col 59}{space 4}-30.47928{col 72}{space 3}-28.45727
{txt}{space 8}d_dist260 {c |}{col 19}{res}{space 2}-52.70421{col 31}{space 2} .2350085{col 42}{space 1} -224.27{col 51}{space 3}0.000{col 59}{space 4}-53.16678{col 72}{space 3}-52.24165
{txt}{space 8}d_dist261 {c |}{col 19}{res}{space 2}-67.78889{col 31}{space 2} .7718556{col 42}{space 1}  -87.83{col 51}{space 3}0.000{col 59}{space 4}-69.30813{col 72}{space 3}-66.26965
{txt}{space 8}d_dist262 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist263 {c |}{col 19}{res}{space 2}-6.501109{col 31}{space 2} .0503362{col 42}{space 1} -129.15{col 51}{space 3}0.000{col 59}{space 4}-6.600186{col 72}{space 3}-6.402033
{txt}{space 8}d_dist264 {c |}{col 19}{res}{space 2} 5.969298{col 31}{space 2} .1164345{col 42}{space 1}   51.27{col 51}{space 3}0.000{col 59}{space 4} 5.740121{col 72}{space 3} 6.198476
{txt}{space 8}d_dist265 {c |}{col 19}{res}{space 2}  29.6219{col 31}{space 2} .0458442{col 42}{space 1}  646.14{col 51}{space 3}0.000{col 59}{space 4} 29.53166{col 72}{space 3} 29.71213
{txt}{space 8}d_dist266 {c |}{col 19}{res}{space 2} 40.24362{col 31}{space 2} .0679503{col 42}{space 1}  592.25{col 51}{space 3}0.000{col 59}{space 4} 40.10988{col 72}{space 3} 40.37737
{txt}{space 8}d_dist267 {c |}{col 19}{res}{space 2}  39.8328{col 31}{space 2} .0462719{col 42}{space 1}  860.84{col 51}{space 3}0.000{col 59}{space 4} 39.74172{col 72}{space 3} 39.92388
{txt}{space 8}d_dist268 {c |}{col 19}{res}{space 2} -3.81638{col 31}{space 2} .0679503{col 42}{space 1}  -56.16{col 51}{space 3}0.000{col 59}{space 4}-3.950127{col 72}{space 3}-3.682634
{txt}{space 8}d_dist269 {c |}{col 19}{res}{space 2} 45.54266{col 31}{space 2} .0237305{col 42}{space 1} 1919.16{col 51}{space 3}0.000{col 59}{space 4} 45.49595{col 72}{space 3} 45.58937
{txt}{space 8}d_dist270 {c |}{col 19}{res}{space 2} 57.15738{col 31}{space 2} .0236004{col 42}{space 1} 2421.88{col 51}{space 3}0.000{col 59}{space 4} 57.11093{col 72}{space 3} 57.20383
{txt}{space 8}d_dist271 {c |}{col 19}{res}{space 2} 32.66341{col 31}{space 2} 2.190402{col 42}{space 1}   14.91{col 51}{space 3}0.000{col 59}{space 4} 28.35205{col 72}{space 3} 36.97476
{txt}{space 8}d_dist272 {c |}{col 19}{res}{space 2} 27.97108{col 31}{space 2} 2.167213{col 42}{space 1}   12.91{col 51}{space 3}0.000{col 59}{space 4} 23.70537{col 72}{space 3} 32.23679
{txt}{space 8}d_dist273 {c |}{col 19}{res}{space 2} 26.20015{col 31}{space 2}  2.16426{col 42}{space 1}   12.11{col 51}{space 3}0.000{col 59}{space 4} 21.94025{col 72}{space 3} 30.46005
{txt}{space 8}d_dist274 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist275 {c |}{col 19}{res}{space 2} 3.321573{col 31}{space 2} .4902794{col 42}{space 1}    6.77{col 51}{space 3}0.000{col 59}{space 4} 2.356559{col 72}{space 3} 4.286587
{txt}{space 8}d_dist276 {c |}{col 19}{res}{space 2} 33.55671{col 31}{space 2} 2.154351{col 42}{space 1}   15.58{col 51}{space 3}0.000{col 59}{space 4} 29.31632{col 72}{space 3} 37.79711
{txt}{space 8}d_dist277 {c |}{col 19}{res}{space 2} 54.68441{col 31}{space 2} 2.153993{col 42}{space 1}   25.39{col 51}{space 3}0.000{col 59}{space 4} 50.44472{col 72}{space 3}  58.9241
{txt}{space 8}d_dist278 {c |}{col 19}{res}{space 2} 14.42321{col 31}{space 2} 2.213431{col 42}{space 1}    6.52{col 51}{space 3}0.000{col 59}{space 4} 10.06653{col 72}{space 3} 18.77989
{txt}{space 8}d_dist279 {c |}{col 19}{res}{space 2} 31.27825{col 31}{space 2} 2.195042{col 42}{space 1}   14.25{col 51}{space 3}0.000{col 59}{space 4} 26.95777{col 72}{space 3} 35.59874
{txt}{space 8}d_dist280 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist281 {c |}{col 19}{res}{space 2} 30.54586{col 31}{space 2} .1270449{col 42}{space 1}  240.43{col 51}{space 3}0.000{col 59}{space 4} 30.29579{col 72}{space 3} 30.79592
{txt}{space 8}d_dist282 {c |}{col 19}{res}{space 2} 26.63801{col 31}{space 2}  .678828{col 42}{space 1}   39.24{col 51}{space 3}0.000{col 59}{space 4} 25.30187{col 72}{space 3} 27.97414
{txt}{space 8}d_dist283 {c |}{col 19}{res}{space 2} 44.76974{col 31}{space 2} .3145069{col 42}{space 1}  142.35{col 51}{space 3}0.000{col 59}{space 4}  44.1507{col 72}{space 3} 45.38878
{txt}{space 8}d_dist284 {c |}{col 19}{res}{space 2}-9.651883{col 31}{space 2} .0547019{col 42}{space 1} -176.44{col 51}{space 3}0.000{col 59}{space 4}-9.759552{col 72}{space 3}-9.544213
{txt}{space 8}d_dist285 {c |}{col 19}{res}{space 2}-10.16719{col 31}{space 2} .7976863{col 42}{space 1}  -12.75{col 51}{space 3}0.000{col 59}{space 4}-11.73727{col 72}{space 3}-8.597112
{txt}{space 8}d_dist286 {c |}{col 19}{res}{space 2} 35.60342{col 31}{space 2} .9277637{col 42}{space 1}   38.38{col 51}{space 3}0.000{col 59}{space 4} 33.77731{col 72}{space 3} 37.42953
{txt}{space 8}d_dist287 {c |}{col 19}{res}{space 2}  12.5374{col 31}{space 2} .9387691{col 42}{space 1}   13.36{col 51}{space 3}0.000{col 59}{space 4} 10.68962{col 72}{space 3} 14.38517
{txt}{space 12}inter {c |}{col 19}{res}{space 2} .7873975{col 31}{space 2} .3725391{col 42}{space 1}    2.11{col 51}{space 3}0.035{col 59}{space 4} .0541314{col 72}{space 3} 1.520664
{txt}cum_count_turbine {c |}{col 19}{res}{space 2} .0066504{col 31}{space 2} .0055473{col 42}{space 1}    1.20{col 51}{space 3}0.232{col 59}{space 4}-.0042683{col 72}{space 3}  .017569
{txt}{space 12}_cons {c |}{col 19}{res}{space 2} 69.37904{col 31}{space 2} 3.957522{col 42}{space 1}   17.53{col 51}{space 3}0.000{col 59}{space 4} 61.58948{col 72}{space 3}  77.1686
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{res}{txt}note: d_sy16 omitted because of collinearity
note: d_sy20 omitted because of collinearity
note: d_sy32 omitted because of collinearity
note: d_sy56 omitted because of collinearity
note: d_sy60 omitted because of collinearity
note: d_dist8 omitted because of collinearity
note: d_dist18 omitted because of collinearity
note: d_dist65 omitted because of collinearity
note: d_dist69 omitted because of collinearity
note: d_dist77 omitted because of collinearity
note: d_dist92 omitted because of collinearity
note: d_dist105 omitted because of collinearity
note: d_dist117 omitted because of collinearity
note: d_dist132 omitted because of collinearity
note: d_dist143 omitted because of collinearity
note: d_dist150 omitted because of collinearity
note: d_dist167 omitted because of collinearity
note: d_dist198 omitted because of collinearity
note: d_dist210 omitted because of collinearity
note: d_dist220 omitted because of collinearity
note: d_dist234 omitted because of collinearity
note: d_dist239 omitted because of collinearity
note: d_dist244 omitted because of collinearity
note: d_dist262 omitted because of collinearity
note: d_dist278 omitted because of collinearity
note: d_dist280 omitted because of collinearity

Linear regression                               Number of obs     = {res}     1,144
                                                {txt}{help j_robustsingular:F(69, 286) }       =  {res}        .
                                                {txt}Prob > F          = {res}         .
                                                {txt}R-squared         = {res}    0.8881
                                                {txt}Root MSE          =    {res}  8.965

{txt}{ralign 86:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}repvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 15}d_sy1 {c |}{col 22}{res}{space 2} 28.90805{col 34}{space 2} 6.026313{col 45}{space 1}    4.80{col 54}{space 3}0.000{col 62}{space 4}  17.0465{col 75}{space 3}  40.7696
{txt}{space 15}d_sy2 {c |}{col 22}{res}{space 2} 21.17594{col 34}{space 2}  3.89005{col 45}{space 1}    5.44{col 54}{space 3}0.000{col 62}{space 4} 13.51918{col 75}{space 3}  28.8327
{txt}{space 15}d_sy3 {c |}{col 22}{res}{space 2} 15.99008{col 34}{space 2} 2.933066{col 45}{space 1}    5.45{col 54}{space 3}0.000{col 62}{space 4} 10.21694{col 75}{space 3} 21.76321
{txt}{space 15}d_sy4 {c |}{col 22}{res}{space 2} 25.32923{col 34}{space 2} 3.290872{col 45}{space 1}    7.70{col 54}{space 3}0.000{col 62}{space 4} 18.85183{col 75}{space 3} 31.80664
{txt}{space 15}d_sy5 {c |}{col 22}{res}{space 2} 11.05237{col 34}{space 2} 4.786816{col 45}{space 1}    2.31{col 54}{space 3}0.022{col 62}{space 4} 1.630514{col 75}{space 3} 20.47423
{txt}{space 15}d_sy6 {c |}{col 22}{res}{space 2} 10.78705{col 34}{space 2} 4.571665{col 45}{space 1}    2.36{col 54}{space 3}0.019{col 62}{space 4} 1.788671{col 75}{space 3} 19.78543
{txt}{space 15}d_sy7 {c |}{col 22}{res}{space 2} 8.511521{col 34}{space 2} 3.442317{col 45}{space 1}    2.47{col 54}{space 3}0.014{col 62}{space 4} 1.736032{col 75}{space 3} 15.28701
{txt}{space 15}d_sy8 {c |}{col 22}{res}{space 2} 19.05748{col 34}{space 2} 2.954194{col 45}{space 1}    6.45{col 54}{space 3}0.000{col 62}{space 4} 13.24276{col 75}{space 3}  24.8722
{txt}{space 15}d_sy9 {c |}{col 22}{res}{space 2} 29.06934{col 34}{space 2} 4.312959{col 45}{space 1}    6.74{col 54}{space 3}0.000{col 62}{space 4} 20.58017{col 75}{space 3} 37.55851
{txt}{space 14}d_sy10 {c |}{col 22}{res}{space 2} 23.04646{col 34}{space 2} 3.613894{col 45}{space 1}    6.38{col 54}{space 3}0.000{col 62}{space 4} 15.93325{col 75}{space 3} 30.15966
{txt}{space 14}d_sy11 {c |}{col 22}{res}{space 2} 29.69483{col 34}{space 2} 3.129635{col 45}{space 1}    9.49{col 54}{space 3}0.000{col 62}{space 4} 23.53479{col 75}{space 3} 35.85487
{txt}{space 14}d_sy12 {c |}{col 22}{res}{space 2} 41.27197{col 34}{space 2} 3.050655{col 45}{space 1}   13.53{col 54}{space 3}0.000{col 62}{space 4} 35.26738{col 75}{space 3} 47.27655
{txt}{space 14}d_sy13 {c |}{col 22}{res}{space 2}  3.46999{col 34}{space 2} 3.955721{col 45}{space 1}    0.88{col 54}{space 3}0.381{col 62}{space 4}-4.316029{col 75}{space 3} 11.25601
{txt}{space 14}d_sy14 {c |}{col 22}{res}{space 2} 5.101497{col 34}{space 2} 3.187285{col 45}{space 1}    1.60{col 54}{space 3}0.111{col 62}{space 4}-1.172015{col 75}{space 3} 11.37501
{txt}{space 14}d_sy15 {c |}{col 22}{res}{space 2}-6.291363{col 34}{space 2} 1.697068{col 45}{space 1}   -3.71{col 54}{space 3}0.000{col 62}{space 4} -9.63169{col 75}{space 3}-2.951036
{txt}{space 14}d_sy16 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 14}d_sy17 {c |}{col 22}{res}{space 2}-3.371049{col 34}{space 2} 9.418491{col 45}{space 1}   -0.36{col 54}{space 3}0.721{col 62}{space 4} -21.9094{col 75}{space 3}  15.1673
{txt}{space 14}d_sy18 {c |}{col 22}{res}{space 2}-12.10172{col 34}{space 2} 4.576988{col 45}{space 1}   -2.64{col 54}{space 3}0.009{col 62}{space 4}-21.11058{col 75}{space 3}-3.092869
{txt}{space 14}d_sy19 {c |}{col 22}{res}{space 2}-7.540381{col 34}{space 2} 1.421748{col 45}{space 1}   -5.30{col 54}{space 3}0.000{col 62}{space 4} -10.3388{col 75}{space 3}-4.741964
{txt}{space 14}d_sy20 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 14}d_sy21 {c |}{col 22}{res}{space 2}-6.608298{col 34}{space 2} 4.200036{col 45}{space 1}   -1.57{col 54}{space 3}0.117{col 62}{space 4} -14.8752{col 75}{space 3} 1.658604
{txt}{space 14}d_sy22 {c |}{col 22}{res}{space 2}-6.800232{col 34}{space 2} 2.837784{col 45}{space 1}   -2.40{col 54}{space 3}0.017{col 62}{space 4}-12.38582{col 75}{space 3}-1.214641
{txt}{space 14}d_sy23 {c |}{col 22}{res}{space 2}  -6.6722{col 34}{space 2} 3.347303{col 45}{space 1}   -1.99{col 54}{space 3}0.047{col 62}{space 4}-13.26067{col 75}{space 3}-.0837266
{txt}{space 14}d_sy24 {c |}{col 22}{res}{space 2} 6.299063{col 34}{space 2} 1.419066{col 45}{space 1}    4.44{col 54}{space 3}0.000{col 62}{space 4} 3.505924{col 75}{space 3} 9.092202
{txt}{space 14}d_sy25 {c |}{col 22}{res}{space 2} 6.952975{col 34}{space 2} 4.070394{col 45}{space 1}    1.71{col 54}{space 3}0.089{col 62}{space 4}-1.058755{col 75}{space 3}  14.9647
{txt}{space 14}d_sy26 {c |}{col 22}{res}{space 2} 2.976028{col 34}{space 2} 2.816952{col 45}{space 1}    1.06{col 54}{space 3}0.292{col 62}{space 4}-2.568559{col 75}{space 3} 8.520615
{txt}{space 14}d_sy27 {c |}{col 22}{res}{space 2} 2.874497{col 34}{space 2} 1.911679{col 45}{space 1}    1.50{col 54}{space 3}0.134{col 62}{space 4}-.8882471{col 75}{space 3} 6.637241
{txt}{space 14}d_sy28 {c |}{col 22}{res}{space 2} 18.34356{col 34}{space 2} 2.108033{col 45}{space 1}    8.70{col 54}{space 3}0.000{col 62}{space 4} 14.19433{col 75}{space 3} 22.49279
{txt}{space 14}d_sy29 {c |}{col 22}{res}{space 2}-13.79361{col 34}{space 2} 8.924507{col 45}{space 1}   -1.55{col 54}{space 3}0.123{col 62}{space 4}-31.35966{col 75}{space 3} 3.772439
{txt}{space 14}d_sy30 {c |}{col 22}{res}{space 2}-19.39867{col 34}{space 2} 7.745466{col 45}{space 1}   -2.50{col 54}{space 3}0.013{col 62}{space 4}-34.64402{col 75}{space 3}-4.153322
{txt}{space 14}d_sy31 {c |}{col 22}{res}{space 2}-9.645709{col 34}{space 2} 6.790773{col 45}{space 1}   -1.42{col 54}{space 3}0.157{col 62}{space 4}-23.01194{col 75}{space 3} 3.720523
{txt}{space 14}d_sy32 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 14}d_sy33 {c |}{col 22}{res}{space 2} 37.89829{col 34}{space 2} 3.845148{col 45}{space 1}    9.86{col 54}{space 3}0.000{col 62}{space 4} 30.32991{col 75}{space 3} 45.46666
{txt}{space 14}d_sy34 {c |}{col 22}{res}{space 2} 30.79761{col 34}{space 2} 4.591108{col 45}{space 1}    6.71{col 54}{space 3}0.000{col 62}{space 4} 21.76096{col 75}{space 3} 39.83425
{txt}{space 14}d_sy35 {c |}{col 22}{res}{space 2} 34.42568{col 34}{space 2} 2.296674{col 45}{space 1}   14.99{col 54}{space 3}0.000{col 62}{space 4} 29.90515{col 75}{space 3}  38.9462
{txt}{space 14}d_sy36 {c |}{col 22}{res}{space 2} 43.07324{col 34}{space 2} 2.055448{col 45}{space 1}   20.96{col 54}{space 3}0.000{col 62}{space 4} 39.02752{col 75}{space 3} 47.11897
{txt}{space 14}d_sy37 {c |}{col 22}{res}{space 2}-15.44222{col 34}{space 2} 6.386461{col 45}{space 1}   -2.42{col 54}{space 3}0.016{col 62}{space 4}-28.01265{col 75}{space 3}-2.871793
{txt}{space 14}d_sy38 {c |}{col 22}{res}{space 2}-19.04231{col 34}{space 2} 4.813122{col 45}{space 1}   -3.96{col 54}{space 3}0.000{col 62}{space 4}-28.51594{col 75}{space 3}-9.568673
{txt}{space 14}d_sy39 {c |}{col 22}{res}{space 2}-13.57129{col 34}{space 2} 5.039382{col 45}{space 1}   -2.69{col 54}{space 3}0.007{col 62}{space 4}-23.49027{col 75}{space 3}-3.652306
{txt}{space 14}d_sy40 {c |}{col 22}{res}{space 2} 14.65956{col 34}{space 2} 3.300129{col 45}{space 1}    4.44{col 54}{space 3}0.000{col 62}{space 4} 8.163939{col 75}{space 3} 21.15518
{txt}{space 14}d_sy41 {c |}{col 22}{res}{space 2} 42.51626{col 34}{space 2}  3.79644{col 45}{space 1}   11.20{col 54}{space 3}0.000{col 62}{space 4} 35.04375{col 75}{space 3} 49.98877
{txt}{space 14}d_sy42 {c |}{col 22}{res}{space 2} 39.19899{col 34}{space 2} 2.949891{col 45}{space 1}   13.29{col 54}{space 3}0.000{col 62}{space 4} 33.39274{col 75}{space 3} 45.00524
{txt}{space 14}d_sy43 {c |}{col 22}{res}{space 2} 44.02763{col 34}{space 2} 1.338159{col 45}{space 1}   32.90{col 54}{space 3}0.000{col 62}{space 4} 41.39374{col 75}{space 3} 46.66152
{txt}{space 14}d_sy44 {c |}{col 22}{res}{space 2} 55.73753{col 34}{space 2} 2.273727{col 45}{space 1}   24.51{col 54}{space 3}0.000{col 62}{space 4} 51.26217{col 75}{space 3} 60.21289
{txt}{space 14}d_sy45 {c |}{col 22}{res}{space 2} 25.98978{col 34}{space 2} 3.907198{col 45}{space 1}    6.65{col 54}{space 3}0.000{col 62}{space 4} 18.29927{col 75}{space 3} 33.68029
{txt}{space 14}d_sy46 {c |}{col 22}{res}{space 2} 27.44648{col 34}{space 2} 2.017533{col 45}{space 1}   13.60{col 54}{space 3}0.000{col 62}{space 4} 23.47539{col 75}{space 3} 31.41758
{txt}{space 14}d_sy47 {c |}{col 22}{res}{space 2} 27.51393{col 34}{space 2}  1.35969{col 45}{space 1}   20.24{col 54}{space 3}0.000{col 62}{space 4} 24.83766{col 75}{space 3}  30.1902
{txt}{space 14}d_sy48 {c |}{col 22}{res}{space 2} 40.67845{col 34}{space 2} 2.776629{col 45}{space 1}   14.65{col 54}{space 3}0.000{col 62}{space 4} 35.21323{col 75}{space 3} 46.14367
{txt}{space 14}d_sy49 {c |}{col 22}{res}{space 2} 10.64679{col 34}{space 2}  3.81678{col 45}{space 1}    2.79{col 54}{space 3}0.006{col 62}{space 4} 3.134251{col 75}{space 3} 18.15934
{txt}{space 14}d_sy50 {c |}{col 22}{res}{space 2} 9.578441{col 34}{space 2} 2.838218{col 45}{space 1}    3.37{col 54}{space 3}0.001{col 62}{space 4} 3.991995{col 75}{space 3} 15.16489
{txt}{space 14}d_sy51 {c |}{col 22}{res}{space 2} 8.922424{col 34}{space 2} 3.069113{col 45}{space 1}    2.91{col 54}{space 3}0.004{col 62}{space 4}  2.88151{col 75}{space 3} 14.96334
{txt}{space 14}d_sy52 {c |}{col 22}{res}{space 2}  25.7552{col 34}{space 2} 3.794013{col 45}{space 1}    6.79{col 54}{space 3}0.000{col 62}{space 4} 18.28747{col 75}{space 3} 33.22293
{txt}{space 14}d_sy53 {c |}{col 22}{res}{space 2} -5.39423{col 34}{space 2} 4.767552{col 45}{space 1}   -1.13{col 54}{space 3}0.259{col 62}{space 4}-14.77817{col 75}{space 3} 3.989711
{txt}{space 14}d_sy54 {c |}{col 22}{res}{space 2}-10.76837{col 34}{space 2} 4.406597{col 45}{space 1}   -2.44{col 54}{space 3}0.015{col 62}{space 4}-19.44185{col 75}{space 3}-2.094899
{txt}{space 14}d_sy55 {c |}{col 22}{res}{space 2}-9.475855{col 34}{space 2} 2.216984{col 45}{space 1}   -4.27{col 54}{space 3}0.000{col 62}{space 4}-13.83953{col 75}{space 3}-5.112181
{txt}{space 14}d_sy56 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 14}d_sy57 {c |}{col 22}{res}{space 2} 1.040868{col 34}{space 2} 3.450334{col 45}{space 1}    0.30{col 54}{space 3}0.763{col 62}{space 4}-5.750401{col 75}{space 3} 7.832137
{txt}{space 14}d_sy58 {c |}{col 22}{res}{space 2}-10.86354{col 34}{space 2} 2.466923{col 45}{space 1}   -4.40{col 54}{space 3}0.000{col 62}{space 4}-15.71916{col 75}{space 3} -6.00791
{txt}{space 14}d_sy59 {c |}{col 22}{res}{space 2}-11.23577{col 34}{space 2} 1.144803{col 45}{space 1}   -9.81{col 54}{space 3}0.000{col 62}{space 4}-13.48908{col 75}{space 3}-8.982464
{txt}{space 14}d_sy60 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 14}d_sy61 {c |}{col 22}{res}{space 2}-.0163872{col 34}{space 2} 4.375495{col 45}{space 1}   -0.00{col 54}{space 3}0.997{col 62}{space 4}-8.628645{col 75}{space 3} 8.595871
{txt}{space 14}d_sy62 {c |}{col 22}{res}{space 2}-2.600137{col 34}{space 2} 3.610226{col 45}{space 1}   -0.72{col 54}{space 3}0.472{col 62}{space 4} -9.70612{col 75}{space 3} 4.505846
{txt}{space 14}d_sy63 {c |}{col 22}{res}{space 2} 1.789469{col 34}{space 2} 2.365822{col 45}{space 1}    0.76{col 54}{space 3}0.450{col 62}{space 4}-2.867163{col 75}{space 3} 6.446102
{txt}{space 14}d_sy64 {c |}{col 22}{res}{space 2} 11.68908{col 34}{space 2} 1.853342{col 45}{space 1}    6.31{col 54}{space 3}0.000{col 62}{space 4} 8.041155{col 75}{space 3}   15.337
{txt}{space 14}d_sy65 {c |}{col 22}{res}{space 2} 30.76297{col 34}{space 2} 3.711947{col 45}{space 1}    8.29{col 54}{space 3}0.000{col 62}{space 4} 23.45677{col 75}{space 3} 38.06917
{txt}{space 14}d_sy66 {c |}{col 22}{res}{space 2} 24.04619{col 34}{space 2} 2.910725{col 45}{space 1}    8.26{col 54}{space 3}0.000{col 62}{space 4} 18.31703{col 75}{space 3} 29.77535
{txt}{space 14}d_sy67 {c |}{col 22}{res}{space 2} 29.29786{col 34}{space 2} 1.926949{col 45}{space 1}   15.20{col 54}{space 3}0.000{col 62}{space 4} 25.50506{col 75}{space 3} 33.09066
{txt}{space 14}d_sy68 {c |}{col 22}{res}{space 2} 38.91057{col 34}{space 2} 2.311652{col 45}{space 1}   16.83{col 54}{space 3}0.000{col 62}{space 4} 34.36056{col 75}{space 3} 43.46058
{txt}{space 14}d_sy69 {c |}{col 22}{res}{space 2} 38.13706{col 34}{space 2} 4.302546{col 45}{space 1}    8.86{col 54}{space 3}0.000{col 62}{space 4} 29.66839{col 75}{space 3} 46.60574
{txt}{space 14}d_sy70 {c |}{col 22}{res}{space 2} 34.41185{col 34}{space 2} 3.991703{col 45}{space 1}    8.62{col 54}{space 3}0.000{col 62}{space 4} 26.55501{col 75}{space 3} 42.26869
{txt}{space 14}d_sy71 {c |}{col 22}{res}{space 2} 36.16664{col 34}{space 2} 2.627178{col 45}{space 1}   13.77{col 54}{space 3}0.000{col 62}{space 4} 30.99558{col 75}{space 3}  41.3377
{txt}{space 14}d_sy72 {c |}{col 22}{res}{space 2} 47.19915{col 34}{space 2} 2.313496{col 45}{space 1}   20.40{col 54}{space 3}0.000{col 62}{space 4} 42.64551{col 75}{space 3} 51.75279
{txt}{space 14}d_sy73 {c |}{col 22}{res}{space 2}-1.003977{col 34}{space 2} 6.292719{col 45}{space 1}   -0.16{col 54}{space 3}0.873{col 62}{space 4}-13.38989{col 75}{space 3} 11.38194
{txt}{space 14}d_sy74 {c |}{col 22}{res}{space 2}-1.208497{col 34}{space 2}  3.24633{col 45}{space 1}   -0.37{col 54}{space 3}0.710{col 62}{space 4}-7.598228{col 75}{space 3} 5.181233
{txt}{space 14}d_sy75 {c |}{col 22}{res}{space 2} 1.945827{col 34}{space 2} 2.155331{col 45}{space 1}    0.90{col 54}{space 3}0.367{col 62}{space 4}-2.296496{col 75}{space 3} 6.188151
{txt}{space 14}d_sy76 {c |}{col 22}{res}{space 2} 13.15113{col 34}{space 2} 1.422295{col 45}{space 1}    9.25{col 54}{space 3}0.000{col 62}{space 4} 10.35164{col 75}{space 3} 15.95063
{txt}{space 14}d_sy77 {c |}{col 22}{res}{space 2} 5.886126{col 34}{space 2} 6.990543{col 45}{space 1}    0.84{col 54}{space 3}0.400{col 62}{space 4}-7.873313{col 75}{space 3} 19.64556
{txt}{space 14}d_sy78 {c |}{col 22}{res}{space 2}-5.133641{col 34}{space 2} 4.801952{col 45}{space 1}   -1.07{col 54}{space 3}0.286{col 62}{space 4}-14.58529{col 75}{space 3} 4.318008
{txt}{space 14}d_sy79 {c |}{col 22}{res}{space 2}  1.81082{col 34}{space 2} 3.235689{col 45}{space 1}    0.56{col 54}{space 3}0.576{col 62}{space 4}-4.557965{col 75}{space 3} 8.179605
{txt}{space 14}d_sy80 {c |}{col 22}{res}{space 2} 21.65659{col 34}{space 2} 5.342285{col 45}{space 1}    4.05{col 54}{space 3}0.000{col 62}{space 4} 11.14141{col 75}{space 3} 32.17178
{txt}{space 14}d_sy81 {c |}{col 22}{res}{space 2} 49.20149{col 34}{space 2}  6.11573{col 45}{space 1}    8.05{col 54}{space 3}0.000{col 62}{space 4} 37.16394{col 75}{space 3} 61.23904
{txt}{space 14}d_sy82 {c |}{col 22}{res}{space 2} 49.59234{col 34}{space 2} 5.288247{col 45}{space 1}    9.38{col 54}{space 3}0.000{col 62}{space 4} 39.18352{col 75}{space 3} 60.00116
{txt}{space 14}d_sy83 {c |}{col 22}{res}{space 2} 38.10795{col 34}{space 2} 8.001057{col 45}{space 1}    4.76{col 54}{space 3}0.000{col 62}{space 4} 22.35953{col 75}{space 3} 53.85638
{txt}{space 14}d_sy84 {c |}{col 22}{res}{space 2}  61.3878{col 34}{space 2} 4.736801{col 45}{space 1}   12.96{col 54}{space 3}0.000{col 62}{space 4} 52.06439{col 75}{space 3} 70.71122
{txt}{space 14}d_sy85 {c |}{col 22}{res}{space 2}-17.24421{col 34}{space 2} 6.278699{col 45}{space 1}   -2.75{col 54}{space 3}0.006{col 62}{space 4}-29.60253{col 75}{space 3}-4.885889
{txt}{space 14}d_sy86 {c |}{col 22}{res}{space 2}-23.28741{col 34}{space 2} 3.626068{col 45}{space 1}   -6.42{col 54}{space 3}0.000{col 62}{space 4}-30.42458{col 75}{space 3}-16.15025
{txt}{space 14}d_sy87 {c |}{col 22}{res}{space 2}-19.71632{col 34}{space 2} 3.185246{col 45}{space 1}   -6.19{col 54}{space 3}0.000{col 62}{space 4}-25.98582{col 75}{space 3}-13.44683
{txt}{space 14}d_sy88 {c |}{col 22}{res}{space 2}-9.877349{col 34}{space 2} 2.520397{col 45}{space 1}   -3.92{col 54}{space 3}0.000{col 62}{space 4}-14.83823{col 75}{space 3}-4.916469
{txt}{space 14}d_sy89 {c |}{col 22}{res}{space 2} 45.19604{col 34}{space 2} 4.921232{col 45}{space 1}    9.18{col 54}{space 3}0.000{col 62}{space 4} 35.50961{col 75}{space 3} 54.88246
{txt}{space 14}d_sy90 {c |}{col 22}{res}{space 2} 40.41602{col 34}{space 2} 3.820453{col 45}{space 1}   10.58{col 54}{space 3}0.000{col 62}{space 4} 32.89625{col 75}{space 3} 47.93579
{txt}{space 14}d_sy91 {c |}{col 22}{res}{space 2} 36.14267{col 34}{space 2} 5.608991{col 45}{space 1}    6.44{col 54}{space 3}0.000{col 62}{space 4} 25.10253{col 75}{space 3} 47.18281
{txt}{space 14}d_sy92 {c |}{col 22}{res}{space 2} 60.28487{col 34}{space 2} 5.381588{col 45}{space 1}   11.20{col 54}{space 3}0.000{col 62}{space 4} 49.69233{col 75}{space 3} 70.87741
{txt}{space 14}d_sy93 {c |}{col 22}{res}{space 2} 21.03806{col 34}{space 2} 3.768574{col 45}{space 1}    5.58{col 54}{space 3}0.000{col 62}{space 4}  13.6204{col 75}{space 3} 28.45572
{txt}{space 14}d_sy94 {c |}{col 22}{res}{space 2} 22.02002{col 34}{space 2} 2.580427{col 45}{space 1}    8.53{col 54}{space 3}0.000{col 62}{space 4} 16.94098{col 75}{space 3} 27.09906
{txt}{space 14}d_sy95 {c |}{col 22}{res}{space 2} 26.81165{col 34}{space 2} 1.708007{col 45}{space 1}   15.70{col 54}{space 3}0.000{col 62}{space 4} 23.44979{col 75}{space 3} 30.17351
{txt}{space 14}d_sy96 {c |}{col 22}{res}{space 2} 34.54576{col 34}{space 2} 2.942956{col 45}{space 1}   11.74{col 54}{space 3}0.000{col 62}{space 4} 28.75316{col 75}{space 3} 40.33837
{txt}{space 14}d_sy97 {c |}{col 22}{res}{space 2} 33.46078{col 34}{space 2} 7.359835{col 45}{space 1}    4.55{col 54}{space 3}0.000{col 62}{space 4} 18.97447{col 75}{space 3}  47.9471
{txt}{space 14}d_sy98 {c |}{col 22}{res}{space 2} 39.75833{col 34}{space 2} 4.816411{col 45}{space 1}    8.25{col 54}{space 3}0.000{col 62}{space 4} 30.27822{col 75}{space 3} 49.23844
{txt}{space 14}d_sy99 {c |}{col 22}{res}{space 2} 38.52603{col 34}{space 2} 5.579963{col 45}{space 1}    6.90{col 54}{space 3}0.000{col 62}{space 4} 27.54302{col 75}{space 3} 49.50903
{txt}{space 13}d_sy100 {c |}{col 22}{res}{space 2} 48.35991{col 34}{space 2} 3.230896{col 45}{space 1}   14.97{col 54}{space 3}0.000{col 62}{space 4} 42.00056{col 75}{space 3} 54.71926
{txt}{space 13}d_dist1 {c |}{col 22}{res}{space 2} 2.895095{col 34}{space 2} .1146206{col 45}{space 1}   25.26{col 54}{space 3}0.000{col 62}{space 4} 2.669488{col 75}{space 3} 3.120702
{txt}{space 13}d_dist2 {c |}{col 22}{res}{space 2} 12.53357{col 34}{space 2} .0468536{col 45}{space 1}  267.50{col 54}{space 3}0.000{col 62}{space 4} 12.44135{col 75}{space 3} 12.62579
{txt}{space 13}d_dist3 {c |}{col 22}{res}{space 2} 17.62553{col 34}{space 2} .3612299{col 45}{space 1}   48.79{col 54}{space 3}0.000{col 62}{space 4} 16.91452{col 75}{space 3} 18.33654
{txt}{space 13}d_dist4 {c |}{col 22}{res}{space 2}-25.29965{col 34}{space 2} .6188492{col 45}{space 1}  -40.88{col 54}{space 3}0.000{col 62}{space 4}-26.51773{col 75}{space 3}-24.08157
{txt}{space 13}d_dist5 {c |}{col 22}{res}{space 2} 1.819289{col 34}{space 2} .2185993{col 45}{space 1}    8.32{col 54}{space 3}0.000{col 62}{space 4} 1.389022{col 75}{space 3} 2.249557
{txt}{space 13}d_dist6 {c |}{col 22}{res}{space 2} 33.52371{col 34}{space 2} .0525662{col 45}{space 1}  637.74{col 54}{space 3}0.000{col 62}{space 4} 33.42024{col 75}{space 3} 33.62717
{txt}{space 13}d_dist7 {c |}{col 22}{res}{space 2}-12.44248{col 34}{space 2} .3718608{col 45}{space 1}  -33.46{col 54}{space 3}0.000{col 62}{space 4}-13.17441{col 75}{space 3}-11.71055
{txt}{space 13}d_dist8 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 13}d_dist9 {c |}{col 22}{res}{space 2}-10.24106{col 34}{space 2} 2.646135{col 45}{space 1}   -3.87{col 54}{space 3}0.000{col 62}{space 4}-15.44943{col 75}{space 3}-5.032687
{txt}{space 12}d_dist10 {c |}{col 22}{res}{space 2} 22.53721{col 34}{space 2} 2.569848{col 45}{space 1}    8.77{col 54}{space 3}0.000{col 62}{space 4}   17.479{col 75}{space 3} 27.59543
{txt}{space 12}d_dist11 {c |}{col 22}{res}{space 2} 18.51681{col 34}{space 2} 2.653039{col 45}{space 1}    6.98{col 54}{space 3}0.000{col 62}{space 4} 13.29485{col 75}{space 3} 23.73877
{txt}{space 12}d_dist12 {c |}{col 22}{res}{space 2} 18.63904{col 34}{space 2} 2.646624{col 45}{space 1}    7.04{col 54}{space 3}0.000{col 62}{space 4} 13.42971{col 75}{space 3} 23.84837
{txt}{space 12}d_dist13 {c |}{col 22}{res}{space 2}-15.62547{col 34}{space 2}  2.64661{col 45}{space 1}   -5.90{col 54}{space 3}0.000{col 62}{space 4}-20.83477{col 75}{space 3}-10.41616
{txt}{space 12}d_dist14 {c |}{col 22}{res}{space 2}-11.67866{col 34}{space 2} 2.656812{col 45}{space 1}   -4.40{col 54}{space 3}0.000{col 62}{space 4}-16.90805{col 75}{space 3}-6.449276
{txt}{space 12}d_dist15 {c |}{col 22}{res}{space 2}-18.57599{col 34}{space 2} 2.746743{col 45}{space 1}   -6.76{col 54}{space 3}0.000{col 62}{space 4}-23.98239{col 75}{space 3} -13.1696
{txt}{space 12}d_dist16 {c |}{col 22}{res}{space 2}-25.34594{col 34}{space 2} 2.744284{col 45}{space 1}   -9.24{col 54}{space 3}0.000{col 62}{space 4}-30.74749{col 75}{space 3}-19.94438
{txt}{space 12}d_dist17 {c |}{col 22}{res}{space 2}-29.19509{col 34}{space 2} 2.662467{col 45}{space 1}  -10.97{col 54}{space 3}0.000{col 62}{space 4} -34.4356{col 75}{space 3}-23.95457
{txt}{space 12}d_dist18 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 12}d_dist19 {c |}{col 22}{res}{space 2} 10.94878{col 34}{space 2} 2.301623{col 45}{space 1}    4.76{col 54}{space 3}0.000{col 62}{space 4} 6.418513{col 75}{space 3} 15.47905
{txt}{space 12}d_dist20 {c |}{col 22}{res}{space 2}-16.48701{col 34}{space 2} 2.680195{col 45}{space 1}   -6.15{col 54}{space 3}0.000{col 62}{space 4}-21.76242{col 75}{space 3} -11.2116
{txt}{space 12}d_dist21 {c |}{col 22}{res}{space 2}-14.92488{col 34}{space 2} 2.654852{col 45}{space 1}   -5.62{col 54}{space 3}0.000{col 62}{space 4}-20.15041{col 75}{space 3}-9.699357
{txt}{space 12}d_dist22 {c |}{col 22}{res}{space 2}-13.72407{col 34}{space 2}  2.65057{col 45}{space 1}   -5.18{col 54}{space 3}0.000{col 62}{space 4}-18.94117{col 75}{space 3}-8.506976
{txt}{space 12}d_dist23 {c |}{col 22}{res}{space 2}-12.54093{col 34}{space 2} 2.673399{col 45}{space 1}   -4.69{col 54}{space 3}0.000{col 62}{space 4}-17.80296{col 75}{space 3}-7.278898
{txt}{space 12}d_dist24 {c |}{col 22}{res}{space 2}-14.18593{col 34}{space 2} 2.673399{col 45}{space 1}   -5.31{col 54}{space 3}0.000{col 62}{space 4}-19.44796{col 75}{space 3}-8.923897
{txt}{space 12}d_dist25 {c |}{col 22}{res}{space 2}-12.56021{col 34}{space 2} 2.648546{col 45}{space 1}   -4.74{col 54}{space 3}0.000{col 62}{space 4}-17.77333{col 75}{space 3}-7.347099
{txt}{space 12}d_dist26 {c |}{col 22}{res}{space 2}-12.80089{col 34}{space 2}  2.59424{col 45}{space 1}   -4.93{col 54}{space 3}0.000{col 62}{space 4}-17.90711{col 75}{space 3} -7.69466
{txt}{space 12}d_dist27 {c |}{col 22}{res}{space 2} 33.51251{col 34}{space 2} 2.664177{col 45}{space 1}   12.58{col 54}{space 3}0.000{col 62}{space 4} 28.26863{col 75}{space 3} 38.75639
{txt}{space 12}d_dist28 {c |}{col 22}{res}{space 2}-10.46931{col 34}{space 2}  2.66932{col 45}{space 1}   -3.92{col 54}{space 3}0.000{col 62}{space 4}-15.72331{col 75}{space 3}-5.215302
{txt}{space 12}d_dist29 {c |}{col 22}{res}{space 2} 37.37096{col 34}{space 2} 2.653281{col 45}{space 1}   14.08{col 54}{space 3}0.000{col 62}{space 4} 32.14852{col 75}{space 3} 42.59339
{txt}{space 12}d_dist30 {c |}{col 22}{res}{space 2} 54.85935{col 34}{space 2} 2.089623{col 45}{space 1}   26.25{col 54}{space 3}0.000{col 62}{space 4} 50.74636{col 75}{space 3} 58.97235
{txt}{space 12}d_dist31 {c |}{col 22}{res}{space 2}-2.084389{col 34}{space 2} 2.867993{col 45}{space 1}   -0.73{col 54}{space 3}0.468{col 62}{space 4} -7.72944{col 75}{space 3} 3.560662
{txt}{space 12}d_dist32 {c |}{col 22}{res}{space 2} 22.34574{col 34}{space 2} 2.680213{col 45}{space 1}    8.34{col 54}{space 3}0.000{col 62}{space 4} 17.07029{col 75}{space 3} 27.62118
{txt}{space 12}d_dist33 {c |}{col 22}{res}{space 2} 23.41761{col 34}{space 2} 2.739645{col 45}{space 1}    8.55{col 54}{space 3}0.000{col 62}{space 4} 18.02518{col 75}{space 3} 28.81004
{txt}{space 12}d_dist34 {c |}{col 22}{res}{space 2} 19.40845{col 34}{space 2} 2.711241{col 45}{space 1}    7.16{col 54}{space 3}0.000{col 62}{space 4} 14.07194{col 75}{space 3} 24.74497
{txt}{space 12}d_dist35 {c |}{col 22}{res}{space 2}-5.783952{col 34}{space 2} 2.832458{col 45}{space 1}   -2.04{col 54}{space 3}0.042{col 62}{space 4}-11.35906{col 75}{space 3}-.2088433
{txt}{space 12}d_dist36 {c |}{col 22}{res}{space 2}-22.48732{col 34}{space 2} 2.645961{col 45}{space 1}   -8.50{col 54}{space 3}0.000{col 62}{space 4}-27.69535{col 75}{space 3}-17.27929
{txt}{space 12}d_dist37 {c |}{col 22}{res}{space 2}-9.777318{col 34}{space 2} 2.666679{col 45}{space 1}   -3.67{col 54}{space 3}0.000{col 62}{space 4}-15.02612{col 75}{space 3}-4.528511
{txt}{space 12}d_dist38 {c |}{col 22}{res}{space 2}-14.48311{col 34}{space 2} 3.021721{col 45}{space 1}   -4.79{col 54}{space 3}0.000{col 62}{space 4}-20.43075{col 75}{space 3}-8.535481
{txt}{space 12}d_dist39 {c |}{col 22}{res}{space 2}-31.68343{col 34}{space 2} 2.673399{col 45}{space 1}  -11.85{col 54}{space 3}0.000{col 62}{space 4}-36.94546{col 75}{space 3} -26.4214
{txt}{space 12}d_dist40 {c |}{col 22}{res}{space 2}-33.41812{col 34}{space 2} 2.672233{col 45}{space 1}  -12.51{col 54}{space 3}0.000{col 62}{space 4}-38.67785{col 75}{space 3}-28.15838
{txt}{space 12}d_dist41 {c |}{col 22}{res}{space 2} -9.08843{col 34}{space 2} 2.673399{col 45}{space 1}   -3.40{col 54}{space 3}0.001{col 62}{space 4}-14.35046{col 75}{space 3}-3.826398
{txt}{space 12}d_dist42 {c |}{col 22}{res}{space 2}-17.07843{col 34}{space 2} 2.673399{col 45}{space 1}   -6.39{col 54}{space 3}0.000{col 62}{space 4}-22.34046{col 75}{space 3} -11.8164
{txt}{space 12}d_dist43 {c |}{col 22}{res}{space 2}-28.10843{col 34}{space 2} 2.673399{col 45}{space 1}  -10.51{col 54}{space 3}0.000{col 62}{space 4}-33.37046{col 75}{space 3} -22.8464
{txt}{space 12}d_dist44 {c |}{col 22}{res}{space 2} -6.18521{col 34}{space 2} 2.656863{col 45}{space 1}   -2.33{col 54}{space 3}0.021{col 62}{space 4} -11.4147{col 75}{space 3}-.9557244
{txt}{space 12}d_dist45 {c |}{col 22}{res}{space 2}-29.03593{col 34}{space 2} 2.673399{col 45}{space 1}  -10.86{col 54}{space 3}0.000{col 62}{space 4}-34.29796{col 75}{space 3} -23.7739
{txt}{space 12}d_dist46 {c |}{col 22}{res}{space 2}-27.78018{col 34}{space 2} 2.667721{col 45}{space 1}  -10.41{col 54}{space 3}0.000{col 62}{space 4}-33.03103{col 75}{space 3}-22.52932
{txt}{space 12}d_dist47 {c |}{col 22}{res}{space 2} -6.23593{col 34}{space 2} 2.673399{col 45}{space 1}   -2.33{col 54}{space 3}0.020{col 62}{space 4}-11.49796{col 75}{space 3}-.9738977
{txt}{space 12}d_dist48 {c |}{col 22}{res}{space 2} 26.12139{col 34}{space 2} 2.654993{col 45}{space 1}    9.84{col 54}{space 3}0.000{col 62}{space 4} 20.89559{col 75}{space 3}  31.3472
{txt}{space 12}d_dist49 {c |}{col 22}{res}{space 2} 35.80788{col 34}{space 2} 2.418344{col 45}{space 1}   14.81{col 54}{space 3}0.000{col 62}{space 4} 31.04787{col 75}{space 3} 40.56789
{txt}{space 12}d_dist50 {c |}{col 22}{res}{space 2}  35.1248{col 34}{space 2} 2.719957{col 45}{space 1}   12.91{col 54}{space 3}0.000{col 62}{space 4} 29.77113{col 75}{space 3} 40.47848
{txt}{space 12}d_dist51 {c |}{col 22}{res}{space 2}-2.674352{col 34}{space 2} 3.112439{col 45}{space 1}   -0.86{col 54}{space 3}0.391{col 62}{space 4}-8.800544{col 75}{space 3}  3.45184
{txt}{space 12}d_dist52 {c |}{col 22}{res}{space 2} 18.87201{col 34}{space 2} 2.661183{col 45}{space 1}    7.09{col 54}{space 3}0.000{col 62}{space 4} 13.63402{col 75}{space 3}    24.11
{txt}{space 12}d_dist53 {c |}{col 22}{res}{space 2} 22.65544{col 34}{space 2} 2.379041{col 45}{space 1}    9.52{col 54}{space 3}0.000{col 62}{space 4} 17.97279{col 75}{space 3} 27.33809
{txt}{space 12}d_dist54 {c |}{col 22}{res}{space 2} 21.15624{col 34}{space 2} 2.646619{col 45}{space 1}    7.99{col 54}{space 3}0.000{col 62}{space 4} 15.94692{col 75}{space 3} 26.36556
{txt}{space 12}d_dist55 {c |}{col 22}{res}{space 2}-4.013431{col 34}{space 2} 2.673399{col 45}{space 1}   -1.50{col 54}{space 3}0.134{col 62}{space 4}-9.275463{col 75}{space 3} 1.248602
{txt}{space 12}d_dist56 {c |}{col 22}{res}{space 2} 21.96169{col 34}{space 2} 2.650081{col 45}{space 1}    8.29{col 54}{space 3}0.000{col 62}{space 4} 16.74556{col 75}{space 3} 27.17783
{txt}{space 12}d_dist57 {c |}{col 22}{res}{space 2} 24.78817{col 34}{space 2} 2.651187{col 45}{space 1}    9.35{col 54}{space 3}0.000{col 62}{space 4} 19.56986{col 75}{space 3} 30.00649
{txt}{space 12}d_dist58 {c |}{col 22}{res}{space 2} 16.43407{col 34}{space 2} 2.673399{col 45}{space 1}    6.15{col 54}{space 3}0.000{col 62}{space 4} 11.17204{col 75}{space 3}  21.6961
{txt}{space 12}d_dist59 {c |}{col 22}{res}{space 2} -5.47649{col 34}{space 2} 2.717168{col 45}{space 1}   -2.02{col 54}{space 3}0.045{col 62}{space 4}-10.82467{col 75}{space 3}-.1283079
{txt}{space 12}d_dist60 {c |}{col 22}{res}{space 2} 28.22994{col 34}{space 2} 2.679121{col 45}{space 1}   10.54{col 54}{space 3}0.000{col 62}{space 4} 22.95664{col 75}{space 3} 33.50323
{txt}{space 12}d_dist61 {c |}{col 22}{res}{space 2}-9.295027{col 34}{space 2} 2.666262{col 45}{space 1}   -3.49{col 54}{space 3}0.001{col 62}{space 4}-14.54301{col 75}{space 3}-4.047042
{txt}{space 12}d_dist62 {c |}{col 22}{res}{space 2}-38.44815{col 34}{space 2} 2.619773{col 45}{space 1}  -14.68{col 54}{space 3}0.000{col 62}{space 4}-43.60463{col 75}{space 3}-33.29167
{txt}{space 12}d_dist63 {c |}{col 22}{res}{space 2}-23.63294{col 34}{space 2}  2.42041{col 45}{space 1}   -9.76{col 54}{space 3}0.000{col 62}{space 4}-28.39702{col 75}{space 3}-18.86886
{txt}{space 12}d_dist64 {c |}{col 22}{res}{space 2}-13.75728{col 34}{space 2} 2.457285{col 45}{space 1}   -5.60{col 54}{space 3}0.000{col 62}{space 4}-18.59393{col 75}{space 3} -8.92062
{txt}{space 12}d_dist65 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 12}d_dist66 {c |}{col 22}{res}{space 2} 9.084751{col 34}{space 2} 2.289169{col 45}{space 1}    3.97{col 54}{space 3}0.000{col 62}{space 4} 4.578995{col 75}{space 3} 13.59051
{txt}{space 12}d_dist67 {c |}{col 22}{res}{space 2} 6.584624{col 34}{space 2} 2.198859{col 45}{space 1}    2.99{col 54}{space 3}0.003{col 62}{space 4} 2.256625{col 75}{space 3} 10.91262
{txt}{space 12}d_dist68 {c |}{col 22}{res}{space 2}-11.60688{col 34}{space 2} 2.278578{col 45}{space 1}   -5.09{col 54}{space 3}0.000{col 62}{space 4}-16.09179{col 75}{space 3}-7.121974
{txt}{space 12}d_dist69 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 12}d_dist70 {c |}{col 22}{res}{space 2}  3.91489{col 34}{space 2} .1822094{col 45}{space 1}   21.49{col 54}{space 3}0.000{col 62}{space 4} 3.556248{col 75}{space 3} 4.273532
{txt}{space 12}d_dist71 {c |}{col 22}{res}{space 2} 35.52743{col 34}{space 2} 2.982769{col 45}{space 1}   11.91{col 54}{space 3}0.000{col 62}{space 4} 29.65646{col 75}{space 3} 41.39839
{txt}{space 12}d_dist72 {c |}{col 22}{res}{space 2} 50.04809{col 34}{space 2}  3.02743{col 45}{space 1}   16.53{col 54}{space 3}0.000{col 62}{space 4} 44.08922{col 75}{space 3} 56.00696
{txt}{space 12}d_dist73 {c |}{col 22}{res}{space 2}-7.018904{col 34}{space 2} .8071568{col 45}{space 1}   -8.70{col 54}{space 3}0.000{col 62}{space 4}-8.607625{col 75}{space 3}-5.430183
{txt}{space 12}d_dist74 {c |}{col 22}{res}{space 2}-13.10341{col 34}{space 2}  .807513{col 45}{space 1}  -16.23{col 54}{space 3}0.000{col 62}{space 4}-14.69284{col 75}{space 3}-11.51399
{txt}{space 12}d_dist75 {c |}{col 22}{res}{space 2} 1.789087{col 34}{space 2}  .807513{col 45}{space 1}    2.22{col 54}{space 3}0.028{col 62}{space 4} .1996644{col 75}{space 3} 3.378509
{txt}{space 12}d_dist76 {c |}{col 22}{res}{space 2}-8.685913{col 34}{space 2}  .807513{col 45}{space 1}  -10.76{col 54}{space 3}0.000{col 62}{space 4}-10.27534{col 75}{space 3}-7.096491
{txt}{space 12}d_dist77 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 12}d_dist78 {c |}{col 22}{res}{space 2} 34.75423{col 34}{space 2} .8076277{col 45}{space 1}   43.03{col 54}{space 3}0.000{col 62}{space 4} 33.16458{col 75}{space 3} 36.34387
{txt}{space 12}d_dist79 {c |}{col 22}{res}{space 2}-7.715705{col 34}{space 2} .8072398{col 45}{space 1}   -9.56{col 54}{space 3}0.000{col 62}{space 4} -9.30459{col 75}{space 3}-6.126821
{txt}{space 12}d_dist80 {c |}{col 22}{res}{space 2} 24.65655{col 34}{space 2} .9448959{col 45}{space 1}   26.09{col 54}{space 3}0.000{col 62}{space 4} 22.79672{col 75}{space 3} 26.51638
{txt}{space 12}d_dist81 {c |}{col 22}{res}{space 2} 3.886309{col 34}{space 2} .8126651{col 45}{space 1}    4.78{col 54}{space 3}0.000{col 62}{space 4} 2.286745{col 75}{space 3} 5.485872
{txt}{space 12}d_dist82 {c |}{col 22}{res}{space 2} 33.27047{col 34}{space 2} .8272455{col 45}{space 1}   40.22{col 54}{space 3}0.000{col 62}{space 4} 31.64221{col 75}{space 3} 34.89873
{txt}{space 12}d_dist83 {c |}{col 22}{res}{space 2} 31.18436{col 34}{space 2} 1.127715{col 45}{space 1}   27.65{col 54}{space 3}0.000{col 62}{space 4} 28.96469{col 75}{space 3} 33.40403
{txt}{space 12}d_dist84 {c |}{col 22}{res}{space 2} .7997618{col 34}{space 2} .8078189{col 45}{space 1}    0.99{col 54}{space 3}0.323{col 62}{space 4}-.7902628{col 75}{space 3} 2.389786
{txt}{space 12}d_dist85 {c |}{col 22}{res}{space 2} 38.25015{col 34}{space 2}  .808239{col 45}{space 1}   47.33{col 54}{space 3}0.000{col 62}{space 4}  36.6593{col 75}{space 3}   39.841
{txt}{space 12}d_dist86 {c |}{col 22}{res}{space 2} 34.81508{col 34}{space 2} .9397116{col 45}{space 1}   37.05{col 54}{space 3}0.000{col 62}{space 4} 32.96545{col 75}{space 3} 36.66471
{txt}{space 12}d_dist87 {c |}{col 22}{res}{space 2} 40.93494{col 34}{space 2} 1.182012{col 45}{space 1}   34.63{col 54}{space 3}0.000{col 62}{space 4} 38.60839{col 75}{space 3} 43.26149
{txt}{space 12}d_dist88 {c |}{col 22}{res}{space 2} 44.90787{col 34}{space 2} .8722908{col 45}{space 1}   51.48{col 54}{space 3}0.000{col 62}{space 4} 43.19094{col 75}{space 3} 46.62479
{txt}{space 12}d_dist89 {c |}{col 22}{res}{space 2} 12.72404{col 34}{space 2} .8957066{col 45}{space 1}   14.21{col 54}{space 3}0.000{col 62}{space 4} 10.96103{col 75}{space 3} 14.48705
{txt}{space 12}d_dist90 {c |}{col 22}{res}{space 2} 46.55644{col 34}{space 2} .9407411{col 45}{space 1}   49.49{col 54}{space 3}0.000{col 62}{space 4} 44.70479{col 75}{space 3}  48.4081
{txt}{space 12}d_dist91 {c |}{col 22}{res}{space 2} 44.61296{col 34}{space 2} .8141518{col 45}{space 1}   54.80{col 54}{space 3}0.000{col 62}{space 4} 43.01047{col 75}{space 3} 46.21545
{txt}{space 12}d_dist92 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 12}d_dist93 {c |}{col 22}{res}{space 2} 12.57799{col 34}{space 2} .7620016{col 45}{space 1}   16.51{col 54}{space 3}0.000{col 62}{space 4} 11.07815{col 75}{space 3} 14.07783
{txt}{space 12}d_dist94 {c |}{col 22}{res}{space 2} 29.18425{col 34}{space 2} .7833505{col 45}{space 1}   37.26{col 54}{space 3}0.000{col 62}{space 4} 27.64238{col 75}{space 3} 30.72611
{txt}{space 12}d_dist95 {c |}{col 22}{res}{space 2} 33.80483{col 34}{space 2} .3655983{col 45}{space 1}   92.46{col 54}{space 3}0.000{col 62}{space 4} 33.08523{col 75}{space 3} 34.52443
{txt}{space 12}d_dist96 {c |}{col 22}{res}{space 2}  36.7632{col 34}{space 2} .7816619{col 45}{space 1}   47.03{col 54}{space 3}0.000{col 62}{space 4} 35.22467{col 75}{space 3} 38.30174
{txt}{space 12}d_dist97 {c |}{col 22}{res}{space 2} 33.03709{col 34}{space 2} .7657736{col 45}{space 1}   43.14{col 54}{space 3}0.000{col 62}{space 4} 31.52983{col 75}{space 3} 34.54436
{txt}{space 12}d_dist98 {c |}{col 22}{res}{space 2} 7.499493{col 34}{space 2} .7824808{col 45}{space 1}    9.58{col 54}{space 3}0.000{col 62}{space 4} 5.959341{col 75}{space 3} 9.039645
{txt}{space 12}d_dist99 {c |}{col 22}{res}{space 2} 13.07023{col 34}{space 2} .9009989{col 45}{space 1}   14.51{col 54}{space 3}0.000{col 62}{space 4}  11.2968{col 75}{space 3} 14.84366
{txt}{space 11}d_dist100 {c |}{col 22}{res}{space 2} 12.75678{col 34}{space 2} 1.325783{col 45}{space 1}    9.62{col 54}{space 3}0.000{col 62}{space 4} 10.14725{col 75}{space 3} 15.36631
{txt}{space 11}d_dist101 {c |}{col 22}{res}{space 2} 77.01004{col 34}{space 2}  5.94542{col 45}{space 1}   12.95{col 54}{space 3}0.000{col 62}{space 4} 65.30771{col 75}{space 3} 88.71237
{txt}{space 11}d_dist102 {c |}{col 22}{res}{space 2} 42.27689{col 34}{space 2} 5.145488{col 45}{space 1}    8.22{col 54}{space 3}0.000{col 62}{space 4} 32.14906{col 75}{space 3} 52.40472
{txt}{space 11}d_dist103 {c |}{col 22}{res}{space 2}  30.0705{col 34}{space 2} 4.962139{col 45}{space 1}    6.06{col 54}{space 3}0.000{col 62}{space 4} 20.30356{col 75}{space 3} 39.83745
{txt}{space 11}d_dist104 {c |}{col 22}{res}{space 2} 53.12128{col 34}{space 2} 5.368943{col 45}{space 1}    9.89{col 54}{space 3}0.000{col 62}{space 4} 42.55362{col 75}{space 3} 63.68893
{txt}{space 11}d_dist105 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist106 {c |}{col 22}{res}{space 2}-32.90015{col 34}{space 2} .3442188{col 45}{space 1}  -95.58{col 54}{space 3}0.000{col 62}{space 4}-33.57767{col 75}{space 3}-32.22262
{txt}{space 11}d_dist107 {c |}{col 22}{res}{space 2}-29.72463{col 34}{space 2} .5541654{col 45}{space 1}  -53.64{col 54}{space 3}0.000{col 62}{space 4}-30.81539{col 75}{space 3}-28.63387
{txt}{space 11}d_dist108 {c |}{col 22}{res}{space 2} -46.3365{col 34}{space 2} .4741918{col 45}{space 1}  -97.72{col 54}{space 3}0.000{col 62}{space 4}-47.26985{col 75}{space 3}-45.40315
{txt}{space 11}d_dist109 {c |}{col 22}{res}{space 2}-41.85631{col 34}{space 2} .7166247{col 45}{space 1}  -58.41{col 54}{space 3}0.000{col 62}{space 4}-43.26684{col 75}{space 3}-40.44578
{txt}{space 11}d_dist110 {c |}{col 22}{res}{space 2} .7104181{col 34}{space 2}  .212697{col 45}{space 1}    3.34{col 54}{space 3}0.001{col 62}{space 4} .2917681{col 75}{space 3} 1.129068
{txt}{space 11}d_dist111 {c |}{col 22}{res}{space 2}-46.69671{col 34}{space 2} .4061523{col 45}{space 1} -114.97{col 54}{space 3}0.000{col 62}{space 4}-47.49614{col 75}{space 3}-45.89729
{txt}{space 11}d_dist112 {c |}{col 22}{res}{space 2}-39.24295{col 34}{space 2} .1734378{col 45}{space 1} -226.27{col 54}{space 3}0.000{col 62}{space 4}-39.58432{col 75}{space 3}-38.90157
{txt}{space 11}d_dist113 {c |}{col 22}{res}{space 2}-2.941278{col 34}{space 2} .0957484{col 45}{space 1}  -30.72{col 54}{space 3}0.000{col 62}{space 4}-3.129739{col 75}{space 3}-2.752817
{txt}{space 11}d_dist114 {c |}{col 22}{res}{space 2}-8.169541{col 34}{space 2} .1318001{col 45}{space 1}  -61.98{col 54}{space 3}0.000{col 62}{space 4}-8.428963{col 75}{space 3} -7.91012
{txt}{space 11}d_dist115 {c |}{col 22}{res}{space 2}-.3155259{col 34}{space 2} .5476914{col 45}{space 1}   -0.58{col 54}{space 3}0.565{col 62}{space 4}-1.393543{col 75}{space 3} .7624913
{txt}{space 11}d_dist116 {c |}{col 22}{res}{space 2} -.023519{col 34}{space 2} .5376989{col 45}{space 1}   -0.04{col 54}{space 3}0.965{col 62}{space 4}-1.081868{col 75}{space 3}  1.03483
{txt}{space 11}d_dist117 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist118 {c |}{col 22}{res}{space 2}  16.1544{col 34}{space 2}  .941696{col 45}{space 1}   17.15{col 54}{space 3}0.000{col 62}{space 4} 14.30086{col 75}{space 3} 18.00793
{txt}{space 11}d_dist119 {c |}{col 22}{res}{space 2} 2.272722{col 34}{space 2} .5555288{col 45}{space 1}    4.09{col 54}{space 3}0.000{col 62}{space 4} 1.179278{col 75}{space 3} 3.366165
{txt}{space 11}d_dist120 {c |}{col 22}{res}{space 2}-18.54747{col 34}{space 2} .2594195{col 45}{space 1}  -71.50{col 54}{space 3}0.000{col 62}{space 4}-19.05808{col 75}{space 3}-18.03686
{txt}{space 11}d_dist121 {c |}{col 22}{res}{space 2}-5.426974{col 34}{space 2} .6178992{col 45}{space 1}   -8.78{col 54}{space 3}0.000{col 62}{space 4} -6.64318{col 75}{space 3}-4.210767
{txt}{space 11}d_dist122 {c |}{col 22}{res}{space 2} 13.62123{col 34}{space 2} 2.069569{col 45}{space 1}    6.58{col 54}{space 3}0.000{col 62}{space 4} 9.547709{col 75}{space 3} 17.69475
{txt}{space 11}d_dist123 {c |}{col 22}{res}{space 2}-33.62076{col 34}{space 2} .5594846{col 45}{space 1}  -60.09{col 54}{space 3}0.000{col 62}{space 4}-34.72199{col 75}{space 3}-32.51953
{txt}{space 11}d_dist124 {c |}{col 22}{res}{space 2}-3.717158{col 34}{space 2} .4256043{col 45}{space 1}   -8.73{col 54}{space 3}0.000{col 62}{space 4}-4.554873{col 75}{space 3}-2.879444
{txt}{space 11}d_dist125 {c |}{col 22}{res}{space 2} -6.61172{col 34}{space 2} .3215455{col 45}{space 1}  -20.56{col 54}{space 3}0.000{col 62}{space 4}-7.244615{col 75}{space 3}-5.978824
{txt}{space 11}d_dist126 {c |}{col 22}{res}{space 2}-6.295181{col 34}{space 2} .3119853{col 45}{space 1}  -20.18{col 54}{space 3}0.000{col 62}{space 4} -6.90926{col 75}{space 3}-5.681102
{txt}{space 11}d_dist127 {c |}{col 22}{res}{space 2}-37.77342{col 34}{space 2} .1944315{col 45}{space 1} -194.28{col 54}{space 3}0.000{col 62}{space 4}-38.15612{col 75}{space 3}-37.39072
{txt}{space 11}d_dist128 {c |}{col 22}{res}{space 2}-7.314314{col 34}{space 2}  .250011{col 45}{space 1}  -29.26{col 54}{space 3}0.000{col 62}{space 4}-7.806409{col 75}{space 3}-6.822219
{txt}{space 11}d_dist129 {c |}{col 22}{res}{space 2}-17.18111{col 34}{space 2}  .323184{col 45}{space 1}  -53.16{col 54}{space 3}0.000{col 62}{space 4}-17.81723{col 75}{space 3}-16.54499
{txt}{space 11}d_dist130 {c |}{col 22}{res}{space 2}-10.33265{col 34}{space 2} .3026637{col 45}{space 1}  -34.14{col 54}{space 3}0.000{col 62}{space 4}-10.92839{col 75}{space 3}-9.736924
{txt}{space 11}d_dist131 {c |}{col 22}{res}{space 2}-19.76643{col 34}{space 2} .4670822{col 45}{space 1}  -42.32{col 54}{space 3}0.000{col 62}{space 4}-20.68579{col 75}{space 3}-18.84708
{txt}{space 11}d_dist132 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist133 {c |}{col 22}{res}{space 2}-14.39393{col 34}{space 2} .4670822{col 45}{space 1}  -30.82{col 54}{space 3}0.000{col 62}{space 4}-15.31328{col 75}{space 3}-13.47458
{txt}{space 11}d_dist134 {c |}{col 22}{res}{space 2}-41.80893{col 34}{space 2} .4670822{col 45}{space 1}  -89.51{col 54}{space 3}0.000{col 62}{space 4}-42.72829{col 75}{space 3}-40.88958
{txt}{space 11}d_dist135 {c |}{col 22}{res}{space 2}-56.60811{col 34}{space 2} .4384418{col 45}{space 1} -129.11{col 54}{space 3}0.000{col 62}{space 4}-57.47109{col 75}{space 3}-55.74512
{txt}{space 11}d_dist136 {c |}{col 22}{res}{space 2}-58.94893{col 34}{space 2} .4670822{col 45}{space 1} -126.21{col 54}{space 3}0.000{col 62}{space 4}-59.86829{col 75}{space 3}-58.02958
{txt}{space 11}d_dist137 {c |}{col 22}{res}{space 2}-47.33508{col 34}{space 2} .3543092{col 45}{space 1} -133.60{col 54}{space 3}0.000{col 62}{space 4}-48.03247{col 75}{space 3} -46.6377
{txt}{space 11}d_dist138 {c |}{col 22}{res}{space 2}-1.800226{col 34}{space 2} 3.236712{col 45}{space 1}   -0.56{col 54}{space 3}0.579{col 62}{space 4}-8.171025{col 75}{space 3} 4.570572
{txt}{space 11}d_dist139 {c |}{col 22}{res}{space 2} 5.075897{col 34}{space 2} .0360216{col 45}{space 1}  140.91{col 54}{space 3}0.000{col 62}{space 4} 5.004996{col 75}{space 3} 5.146798
{txt}{space 11}d_dist140 {c |}{col 22}{res}{space 2} 6.011029{col 34}{space 2} .5267836{col 45}{space 1}   11.41{col 54}{space 3}0.000{col 62}{space 4} 4.974165{col 75}{space 3} 7.047894
{txt}{space 11}d_dist141 {c |}{col 22}{res}{space 2}-22.48744{col 34}{space 2}  .960008{col 45}{space 1}  -23.42{col 54}{space 3}0.000{col 62}{space 4}-24.37702{col 75}{space 3}-20.59786
{txt}{space 11}d_dist142 {c |}{col 22}{res}{space 2}-31.42962{col 34}{space 2} 1.442595{col 45}{space 1}  -21.79{col 54}{space 3}0.000{col 62}{space 4}-34.26907{col 75}{space 3}-28.59017
{txt}{space 11}d_dist143 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist144 {c |}{col 22}{res}{space 2}-19.25483{col 34}{space 2} .8481129{col 45}{space 1}  -22.70{col 54}{space 3}0.000{col 62}{space 4}-20.92417{col 75}{space 3} -17.5855
{txt}{space 11}d_dist145 {c |}{col 22}{res}{space 2} -18.5483{col 34}{space 2} 1.007113{col 45}{space 1}  -18.42{col 54}{space 3}0.000{col 62}{space 4}-20.53059{col 75}{space 3}-16.56601
{txt}{space 11}d_dist146 {c |}{col 22}{res}{space 2}-21.60794{col 34}{space 2}  .184981{col 45}{space 1} -116.81{col 54}{space 3}0.000{col 62}{space 4}-21.97203{col 75}{space 3}-21.24384
{txt}{space 11}d_dist147 {c |}{col 22}{res}{space 2} 25.21565{col 34}{space 2} .4939852{col 45}{space 1}   51.05{col 54}{space 3}0.000{col 62}{space 4} 24.24334{col 75}{space 3} 26.18796
{txt}{space 11}d_dist148 {c |}{col 22}{res}{space 2}-1.839962{col 34}{space 2} .9850881{col 45}{space 1}   -1.87{col 54}{space 3}0.063{col 62}{space 4}-3.778904{col 75}{space 3} .0989803
{txt}{space 11}d_dist149 {c |}{col 22}{res}{space 2}-2.800532{col 34}{space 2} .4079148{col 45}{space 1}   -6.87{col 54}{space 3}0.000{col 62}{space 4}-3.603428{col 75}{space 3}-1.997636
{txt}{space 11}d_dist150 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist151 {c |}{col 22}{res}{space 2} 25.95159{col 34}{space 2} .4973481{col 45}{space 1}   52.18{col 54}{space 3}0.000{col 62}{space 4} 24.97266{col 75}{space 3} 26.93052
{txt}{space 11}d_dist152 {c |}{col 22}{res}{space 2} 29.22448{col 34}{space 2}  .454103{col 45}{space 1}   64.36{col 54}{space 3}0.000{col 62}{space 4} 28.33067{col 75}{space 3} 30.11829
{txt}{space 11}d_dist153 {c |}{col 22}{res}{space 2} 30.78976{col 34}{space 2} .9228542{col 45}{space 1}   33.36{col 54}{space 3}0.000{col 62}{space 4} 28.97331{col 75}{space 3}  32.6062
{txt}{space 11}d_dist154 {c |}{col 22}{res}{space 2} 29.40645{col 34}{space 2} .5432753{col 45}{space 1}   54.13{col 54}{space 3}0.000{col 62}{space 4} 28.33712{col 75}{space 3} 30.47577
{txt}{space 11}d_dist155 {c |}{col 22}{res}{space 2}  11.8604{col 34}{space 2} 1.499139{col 45}{space 1}    7.91{col 54}{space 3}0.000{col 62}{space 4} 8.909655{col 75}{space 3} 14.81115
{txt}{space 11}d_dist156 {c |}{col 22}{res}{space 2} 40.68565{col 34}{space 2} 1.486459{col 45}{space 1}   27.37{col 54}{space 3}0.000{col 62}{space 4} 37.75986{col 75}{space 3} 43.61144
{txt}{space 11}d_dist157 {c |}{col 22}{res}{space 2} 31.87019{col 34}{space 2} 1.427238{col 45}{space 1}   22.33{col 54}{space 3}0.000{col 62}{space 4} 29.06096{col 75}{space 3} 34.67941
{txt}{space 11}d_dist158 {c |}{col 22}{res}{space 2} 31.80211{col 34}{space 2} .7529541{col 45}{space 1}   42.24{col 54}{space 3}0.000{col 62}{space 4} 30.32007{col 75}{space 3} 33.28414
{txt}{space 11}d_dist159 {c |}{col 22}{res}{space 2} 28.46853{col 34}{space 2} .6129866{col 45}{space 1}   46.44{col 54}{space 3}0.000{col 62}{space 4} 27.26199{col 75}{space 3} 29.67506
{txt}{space 11}d_dist160 {c |}{col 22}{res}{space 2}-7.802368{col 34}{space 2} .5682584{col 45}{space 1}  -13.73{col 54}{space 3}0.000{col 62}{space 4}-8.920867{col 75}{space 3}-6.683869
{txt}{space 11}d_dist161 {c |}{col 22}{res}{space 2} 35.11569{col 34}{space 2} .5849328{col 45}{space 1}   60.03{col 54}{space 3}0.000{col 62}{space 4} 33.96437{col 75}{space 3} 36.26701
{txt}{space 11}d_dist162 {c |}{col 22}{res}{space 2} 26.41454{col 34}{space 2} .6592187{col 45}{space 1}   40.07{col 54}{space 3}0.000{col 62}{space 4}   25.117{col 75}{space 3} 27.71207
{txt}{space 11}d_dist163 {c |}{col 22}{res}{space 2} 38.46495{col 34}{space 2} .5046586{col 45}{space 1}   76.22{col 54}{space 3}0.000{col 62}{space 4} 37.47164{col 75}{space 3} 39.45827
{txt}{space 11}d_dist164 {c |}{col 22}{res}{space 2} 28.79594{col 34}{space 2} .0801202{col 45}{space 1}  359.41{col 54}{space 3}0.000{col 62}{space 4} 28.63824{col 75}{space 3} 28.95364
{txt}{space 11}d_dist165 {c |}{col 22}{res}{space 2} 5.623543{col 34}{space 2} .7650073{col 45}{space 1}    7.35{col 54}{space 3}0.000{col 62}{space 4} 4.117785{col 75}{space 3} 7.129302
{txt}{space 11}d_dist166 {c |}{col 22}{res}{space 2} 24.98276{col 34}{space 2} .0590165{col 45}{space 1}  423.32{col 54}{space 3}0.000{col 62}{space 4} 24.86659{col 75}{space 3} 25.09892
{txt}{space 11}d_dist167 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist168 {c |}{col 22}{res}{space 2} 1.779216{col 34}{space 2} .0204254{col 45}{space 1}   87.11{col 54}{space 3}0.000{col 62}{space 4} 1.739013{col 75}{space 3} 1.819419
{txt}{space 11}d_dist169 {c |}{col 22}{res}{space 2}-26.36756{col 34}{space 2} .4850186{col 45}{space 1}  -54.36{col 54}{space 3}0.000{col 62}{space 4}-27.32222{col 75}{space 3} -25.4129
{txt}{space 11}d_dist170 {c |}{col 22}{res}{space 2} 35.12061{col 34}{space 2} .0441654{col 45}{space 1}  795.21{col 54}{space 3}0.000{col 62}{space 4} 35.03368{col 75}{space 3} 35.20754
{txt}{space 11}d_dist171 {c |}{col 22}{res}{space 2} 9.364435{col 34}{space 2} .4074091{col 45}{space 1}   22.99{col 54}{space 3}0.000{col 62}{space 4} 8.562535{col 75}{space 3} 10.16634
{txt}{space 11}d_dist172 {c |}{col 22}{res}{space 2}-7.193344{col 34}{space 2} .6140021{col 45}{space 1}  -11.72{col 54}{space 3}0.000{col 62}{space 4} -8.40188{col 75}{space 3}-5.984808
{txt}{space 11}d_dist173 {c |}{col 22}{res}{space 2}-11.83315{col 34}{space 2} .9614517{col 45}{space 1}  -12.31{col 54}{space 3}0.000{col 62}{space 4}-13.72557{col 75}{space 3}-9.940734
{txt}{space 11}d_dist174 {c |}{col 22}{res}{space 2}-21.37973{col 34}{space 2}  .638997{col 45}{space 1}  -33.46{col 54}{space 3}0.000{col 62}{space 4}-22.63746{col 75}{space 3}-20.12199
{txt}{space 11}d_dist175 {c |}{col 22}{res}{space 2} 7.448163{col 34}{space 2} .6256716{col 45}{space 1}   11.90{col 54}{space 3}0.000{col 62}{space 4} 6.216658{col 75}{space 3} 8.679668
{txt}{space 11}d_dist176 {c |}{col 22}{res}{space 2}-17.92489{col 34}{space 2} .5929253{col 45}{space 1}  -30.23{col 54}{space 3}0.000{col 62}{space 4}-19.09194{col 75}{space 3}-16.75784
{txt}{space 11}d_dist177 {c |}{col 22}{res}{space 2}-33.96267{col 34}{space 2} .6002663{col 45}{space 1}  -56.58{col 54}{space 3}0.000{col 62}{space 4}-35.14417{col 75}{space 3}-32.78117
{txt}{space 11}d_dist178 {c |}{col 22}{res}{space 2}-53.82364{col 34}{space 2}   .58929{col 45}{space 1}  -91.34{col 54}{space 3}0.000{col 62}{space 4}-54.98354{col 75}{space 3}-52.66375
{txt}{space 11}d_dist179 {c |}{col 22}{res}{space 2}-41.48386{col 34}{space 2} 1.081902{col 45}{space 1}  -38.34{col 54}{space 3}0.000{col 62}{space 4}-43.61336{col 75}{space 3}-39.35436
{txt}{space 11}d_dist180 {c |}{col 22}{res}{space 2} -38.2426{col 34}{space 2} .7010081{col 45}{space 1}  -54.55{col 54}{space 3}0.000{col 62}{space 4}-39.62239{col 75}{space 3}-36.86281
{txt}{space 11}d_dist181 {c |}{col 22}{res}{space 2}-39.90453{col 34}{space 2} .5888735{col 45}{space 1}  -67.76{col 54}{space 3}0.000{col 62}{space 4}-41.06361{col 75}{space 3}-38.74546
{txt}{space 11}d_dist182 {c |}{col 22}{res}{space 2}-51.04644{col 34}{space 2} .7353345{col 45}{space 1}  -69.42{col 54}{space 3}0.000{col 62}{space 4}-52.49379{col 75}{space 3}-49.59909
{txt}{space 11}d_dist183 {c |}{col 22}{res}{space 2}-50.87598{col 34}{space 2} .5866514{col 45}{space 1}  -86.72{col 54}{space 3}0.000{col 62}{space 4}-52.03068{col 75}{space 3}-49.72128
{txt}{space 11}d_dist184 {c |}{col 22}{res}{space 2}-49.29249{col 34}{space 2} .7644241{col 45}{space 1}  -64.48{col 54}{space 3}0.000{col 62}{space 4} -50.7971{col 75}{space 3}-47.78788
{txt}{space 11}d_dist185 {c |}{col 22}{res}{space 2}-7.270565{col 34}{space 2} .8180418{col 45}{space 1}   -8.89{col 54}{space 3}0.000{col 62}{space 4}-8.880712{col 75}{space 3}-5.660419
{txt}{space 11}d_dist186 {c |}{col 22}{res}{space 2}-39.92822{col 34}{space 2} 1.227781{col 45}{space 1}  -32.52{col 54}{space 3}0.000{col 62}{space 4}-42.34486{col 75}{space 3}-37.51159
{txt}{space 11}d_dist187 {c |}{col 22}{res}{space 2}-50.92322{col 34}{space 2} 1.227781{col 45}{space 1}  -41.48{col 54}{space 3}0.000{col 62}{space 4}-53.33986{col 75}{space 3}-48.50659
{txt}{space 11}d_dist188 {c |}{col 22}{res}{space 2}-54.78822{col 34}{space 2} 1.227781{col 45}{space 1}  -44.62{col 54}{space 3}0.000{col 62}{space 4}-57.20486{col 75}{space 3}-52.37159
{txt}{space 11}d_dist189 {c |}{col 22}{res}{space 2}-36.27251{col 34}{space 2} 1.092077{col 45}{space 1}  -33.21{col 54}{space 3}0.000{col 62}{space 4}-38.42204{col 75}{space 3}-34.12299
{txt}{space 11}d_dist190 {c |}{col 22}{res}{space 2} -26.1745{col 34}{space 2} .9630671{col 45}{space 1}  -27.18{col 54}{space 3}0.000{col 62}{space 4} -28.0701{col 75}{space 3}-24.27891
{txt}{space 11}d_dist191 {c |}{col 22}{res}{space 2}-5.765395{col 34}{space 2} .8745722{col 45}{space 1}   -6.59{col 54}{space 3}0.000{col 62}{space 4} -7.48681{col 75}{space 3} -4.04398
{txt}{space 11}d_dist192 {c |}{col 22}{res}{space 2}-2.849307{col 34}{space 2} .9035027{col 45}{space 1}   -3.15{col 54}{space 3}0.002{col 62}{space 4}-4.627665{col 75}{space 3}-1.070949
{txt}{space 11}d_dist193 {c |}{col 22}{res}{space 2} -25.4245{col 34}{space 2} .6547894{col 45}{space 1}  -38.83{col 54}{space 3}0.000{col 62}{space 4}-26.71332{col 75}{space 3}-24.13569
{txt}{space 11}d_dist194 {c |}{col 22}{res}{space 2}-30.16517{col 34}{space 2} 1.039104{col 45}{space 1}  -29.03{col 54}{space 3}0.000{col 62}{space 4}-32.21043{col 75}{space 3}-28.11991
{txt}{space 11}d_dist195 {c |}{col 22}{res}{space 2} 6.396155{col 34}{space 2} 1.542554{col 45}{space 1}    4.15{col 54}{space 3}0.000{col 62}{space 4} 3.359956{col 75}{space 3} 9.432353
{txt}{space 11}d_dist196 {c |}{col 22}{res}{space 2}-5.743807{col 34}{space 2} .8500851{col 45}{space 1}   -6.76{col 54}{space 3}0.000{col 62}{space 4}-7.417024{col 75}{space 3}-4.070591
{txt}{space 11}d_dist197 {c |}{col 22}{res}{space 2} 4.071642{col 34}{space 2} .5975006{col 45}{space 1}    6.81{col 54}{space 3}0.000{col 62}{space 4} 2.895586{col 75}{space 3} 5.247698
{txt}{space 11}d_dist198 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist199 {c |}{col 22}{res}{space 2}-23.23628{col 34}{space 2} .6155416{col 45}{space 1}  -37.75{col 54}{space 3}0.000{col 62}{space 4}-24.44785{col 75}{space 3}-22.02471
{txt}{space 11}d_dist200 {c |}{col 22}{res}{space 2}-27.98349{col 34}{space 2} .8786477{col 45}{space 1}  -31.85{col 54}{space 3}0.000{col 62}{space 4}-29.71292{col 75}{space 3}-26.25405
{txt}{space 11}d_dist201 {c |}{col 22}{res}{space 2}-4.349986{col 34}{space 2} .7145642{col 45}{space 1}   -6.09{col 54}{space 3}0.000{col 62}{space 4}-5.756457{col 75}{space 3}-2.943514
{txt}{space 11}d_dist202 {c |}{col 22}{res}{space 2}-40.31927{col 34}{space 2}   .17357{col 45}{space 1} -232.29{col 54}{space 3}0.000{col 62}{space 4} -40.6609{col 75}{space 3}-39.97763
{txt}{space 11}d_dist203 {c |}{col 22}{res}{space 2}-28.85948{col 34}{space 2} .0406591{col 45}{space 1} -709.79{col 54}{space 3}0.000{col 62}{space 4}-28.93951{col 75}{space 3}-28.77945
{txt}{space 11}d_dist204 {c |}{col 22}{res}{space 2} 3.958113{col 34}{space 2} .7139938{col 45}{space 1}    5.54{col 54}{space 3}0.000{col 62}{space 4} 2.552764{col 75}{space 3} 5.363462
{txt}{space 11}d_dist205 {c |}{col 22}{res}{space 2} -29.6975{col 34}{space 2}        .{col 45}{space 1}       .{col 54}{space 3}    .{col 62}{space 4}        .{col 75}{space 3}        .
{txt}{space 11}d_dist206 {c |}{col 22}{res}{space 2}-6.880455{col 34}{space 2} .1660243{col 45}{space 1}  -41.44{col 54}{space 3}0.000{col 62}{space 4} -7.20724{col 75}{space 3}-6.553671
{txt}{space 11}d_dist207 {c |}{col 22}{res}{space 2} 4.256072{col 34}{space 2} .0051141{col 45}{space 1}  832.22{col 54}{space 3}0.000{col 62}{space 4} 4.246006{col 75}{space 3} 4.266138
{txt}{space 11}d_dist208 {c |}{col 22}{res}{space 2}-34.06863{col 34}{space 2} .1669348{col 45}{space 1} -204.08{col 54}{space 3}0.000{col 62}{space 4}-34.39721{col 75}{space 3}-33.74005
{txt}{space 11}d_dist209 {c |}{col 22}{res}{space 2}-18.33437{col 34}{space 2} .0464847{col 45}{space 1} -394.42{col 54}{space 3}0.000{col 62}{space 4}-18.42587{col 75}{space 3}-18.24288
{txt}{space 11}d_dist210 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist211 {c |}{col 22}{res}{space 2}-3.343731{col 34}{space 2} .1333962{col 45}{space 1}  -25.07{col 54}{space 3}0.000{col 62}{space 4}-3.606294{col 75}{space 3}-3.081169
{txt}{space 11}d_dist212 {c |}{col 22}{res}{space 2}-20.47222{col 34}{space 2} .4516857{col 45}{space 1}  -45.32{col 54}{space 3}0.000{col 62}{space 4}-21.36127{col 75}{space 3}-19.58317
{txt}{space 11}d_dist213 {c |}{col 22}{res}{space 2}-34.92028{col 34}{space 2} .0114172{col 45}{space 1}-3058.57{col 54}{space 3}0.000{col 62}{space 4}-34.94276{col 75}{space 3}-34.89781
{txt}{space 11}d_dist214 {c |}{col 22}{res}{space 2}-28.26471{col 34}{space 2} .0093727{col 45}{space 1}-3015.63{col 54}{space 3}0.000{col 62}{space 4}-28.28316{col 75}{space 3}-28.24626
{txt}{space 11}d_dist215 {c |}{col 22}{res}{space 2} 21.94913{col 34}{space 2} .0492588{col 45}{space 1}  445.59{col 54}{space 3}0.000{col 62}{space 4} 21.85218{col 75}{space 3} 22.04609
{txt}{space 11}d_dist216 {c |}{col 22}{res}{space 2} 28.68833{col 34}{space 2} .0384944{col 45}{space 1}  745.26{col 54}{space 3}0.000{col 62}{space 4} 28.61256{col 75}{space 3}  28.7641
{txt}{space 11}d_dist217 {c |}{col 22}{res}{space 2} 33.21732{col 34}{space 2} .6570371{col 45}{space 1}   50.56{col 54}{space 3}0.000{col 62}{space 4} 31.92408{col 75}{space 3} 34.51056
{txt}{space 11}d_dist218 {c |}{col 22}{res}{space 2} 36.03352{col 34}{space 2} 1.288373{col 45}{space 1}   27.97{col 54}{space 3}0.000{col 62}{space 4} 33.49762{col 75}{space 3} 38.56942
{txt}{space 11}d_dist219 {c |}{col 22}{res}{space 2} 36.43369{col 34}{space 2} 1.239177{col 45}{space 1}   29.40{col 54}{space 3}0.000{col 62}{space 4} 33.99462{col 75}{space 3} 38.87275
{txt}{space 11}d_dist220 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist221 {c |}{col 22}{res}{space 2} 32.86868{col 34}{space 2} .7974047{col 45}{space 1}   41.22{col 54}{space 3}0.000{col 62}{space 4} 31.29915{col 75}{space 3}  34.4382
{txt}{space 11}d_dist222 {c |}{col 22}{res}{space 2} 38.36499{col 34}{space 2} 1.086729{col 45}{space 1}   35.30{col 54}{space 3}0.000{col 62}{space 4} 36.22599{col 75}{space 3} 40.50399
{txt}{space 11}d_dist223 {c |}{col 22}{res}{space 2}   3.0361{col 34}{space 2} 1.467142{col 45}{space 1}    2.07{col 54}{space 3}0.039{col 62}{space 4} .1483354{col 75}{space 3} 5.923865
{txt}{space 11}d_dist224 {c |}{col 22}{res}{space 2} 9.572023{col 34}{space 2} .9167477{col 45}{space 1}   10.44{col 54}{space 3}0.000{col 62}{space 4} 7.767595{col 75}{space 3} 11.37645
{txt}{space 11}d_dist225 {c |}{col 22}{res}{space 2}-16.98536{col 34}{space 2} 1.014515{col 45}{space 1}  -16.74{col 54}{space 3}0.000{col 62}{space 4}-18.98222{col 75}{space 3} -14.9885
{txt}{space 11}d_dist226 {c |}{col 22}{res}{space 2} 28.80727{col 34}{space 2} .8013729{col 45}{space 1}   35.95{col 54}{space 3}0.000{col 62}{space 4} 27.22993{col 75}{space 3}  30.3846
{txt}{space 11}d_dist227 {c |}{col 22}{res}{space 2} 8.028018{col 34}{space 2} .7254317{col 45}{space 1}   11.07{col 54}{space 3}0.000{col 62}{space 4} 6.600155{col 75}{space 3}  9.45588
{txt}{space 11}d_dist228 {c |}{col 22}{res}{space 2}  33.1694{col 34}{space 2} .9197561{col 45}{space 1}   36.06{col 54}{space 3}0.000{col 62}{space 4} 31.35905{col 75}{space 3} 34.97975
{txt}{space 11}d_dist229 {c |}{col 22}{res}{space 2} 25.12636{col 34}{space 2} 1.040013{col 45}{space 1}   24.16{col 54}{space 3}0.000{col 62}{space 4} 23.07931{col 75}{space 3} 27.17341
{txt}{space 11}d_dist230 {c |}{col 22}{res}{space 2} 26.76481{col 34}{space 2} .7863779{col 45}{space 1}   34.04{col 54}{space 3}0.000{col 62}{space 4} 25.21698{col 75}{space 3} 28.31263
{txt}{space 11}d_dist231 {c |}{col 22}{res}{space 2}-5.422175{col 34}{space 2} .3650896{col 45}{space 1}  -14.85{col 54}{space 3}0.000{col 62}{space 4}-6.140778{col 75}{space 3}-4.703571
{txt}{space 11}d_dist232 {c |}{col 22}{res}{space 2} 19.38609{col 34}{space 2} .1506349{col 45}{space 1}  128.70{col 54}{space 3}0.000{col 62}{space 4} 19.08959{col 75}{space 3} 19.68258
{txt}{space 11}d_dist233 {c |}{col 22}{res}{space 2}  41.5339{col 34}{space 2} .6265879{col 45}{space 1}   66.29{col 54}{space 3}0.000{col 62}{space 4} 40.30059{col 75}{space 3} 42.76721
{txt}{space 11}d_dist234 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist235 {c |}{col 22}{res}{space 2} 53.46885{col 34}{space 2} 2.509876{col 45}{space 1}   21.30{col 54}{space 3}0.000{col 62}{space 4} 48.52867{col 75}{space 3} 58.40902
{txt}{space 11}d_dist236 {c |}{col 22}{res}{space 2} 52.39576{col 34}{space 2} .9453706{col 45}{space 1}   55.42{col 54}{space 3}0.000{col 62}{space 4} 50.53499{col 75}{space 3} 54.25652
{txt}{space 11}d_dist237 {c |}{col 22}{res}{space 2} 31.90648{col 34}{space 2} .4406895{col 45}{space 1}   72.40{col 54}{space 3}0.000{col 62}{space 4} 31.03907{col 75}{space 3} 32.77388
{txt}{space 11}d_dist238 {c |}{col 22}{res}{space 2}-47.07868{col 34}{space 2} 2.997341{col 45}{space 1}  -15.71{col 54}{space 3}0.000{col 62}{space 4}-52.97832{col 75}{space 3}-41.17903
{txt}{space 11}d_dist239 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist240 {c |}{col 22}{res}{space 2}-51.58017{col 34}{space 2} 3.089888{col 45}{space 1}  -16.69{col 54}{space 3}0.000{col 62}{space 4}-57.66198{col 75}{space 3}-45.49836
{txt}{space 11}d_dist241 {c |}{col 22}{res}{space 2}-46.49856{col 34}{space 2} 3.004029{col 45}{space 1}  -15.48{col 54}{space 3}0.000{col 62}{space 4}-52.41137{col 75}{space 3}-40.58575
{txt}{space 11}d_dist242 {c |}{col 22}{res}{space 2}-31.26583{col 34}{space 2} 3.083731{col 45}{space 1}  -10.14{col 54}{space 3}0.000{col 62}{space 4}-37.33552{col 75}{space 3}-25.19615
{txt}{space 11}d_dist243 {c |}{col 22}{res}{space 2}-4.614205{col 34}{space 2} .2359611{col 45}{space 1}  -19.55{col 54}{space 3}0.000{col 62}{space 4}-5.078645{col 75}{space 3}-4.149764
{txt}{space 11}d_dist244 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist245 {c |}{col 22}{res}{space 2} 45.68807{col 34}{space 2} .6135008{col 45}{space 1}   74.47{col 54}{space 3}0.000{col 62}{space 4} 44.48052{col 75}{space 3} 46.89562
{txt}{space 11}d_dist246 {c |}{col 22}{res}{space 2} 40.78897{col 34}{space 2} .1381085{col 45}{space 1}  295.34{col 54}{space 3}0.000{col 62}{space 4} 40.51713{col 75}{space 3} 41.06081
{txt}{space 11}d_dist247 {c |}{col 22}{res}{space 2} 62.49082{col 34}{space 2} .4536728{col 45}{space 1}  137.74{col 54}{space 3}0.000{col 62}{space 4} 61.59786{col 75}{space 3} 63.38378
{txt}{space 11}d_dist248 {c |}{col 22}{res}{space 2} 42.93513{col 34}{space 2} .4666295{col 45}{space 1}   92.01{col 54}{space 3}0.000{col 62}{space 4} 42.01667{col 75}{space 3}  43.8536
{txt}{space 11}d_dist249 {c |}{col 22}{res}{space 2} 39.67751{col 34}{space 2} .3476228{col 45}{space 1}  114.14{col 54}{space 3}0.000{col 62}{space 4} 38.99329{col 75}{space 3} 40.36174
{txt}{space 11}d_dist250 {c |}{col 22}{res}{space 2} 40.27054{col 34}{space 2}  .303979{col 45}{space 1}  132.48{col 54}{space 3}0.000{col 62}{space 4} 39.67222{col 75}{space 3} 40.86886
{txt}{space 11}d_dist251 {c |}{col 22}{res}{space 2} 57.71035{col 34}{space 2} .6272388{col 45}{space 1}   92.01{col 54}{space 3}0.000{col 62}{space 4} 56.47576{col 75}{space 3} 58.94494
{txt}{space 11}d_dist252 {c |}{col 22}{res}{space 2} 51.77434{col 34}{space 2} .3796017{col 45}{space 1}  136.39{col 54}{space 3}0.000{col 62}{space 4} 51.02717{col 75}{space 3}  52.5215
{txt}{space 11}d_dist253 {c |}{col 22}{res}{space 2} 22.77755{col 34}{space 2} .3755297{col 45}{space 1}   60.65{col 54}{space 3}0.000{col 62}{space 4}  22.0384{col 75}{space 3} 23.51671
{txt}{space 11}d_dist254 {c |}{col 22}{res}{space 2} 23.10819{col 34}{space 2} .4516207{col 45}{space 1}   51.17{col 54}{space 3}0.000{col 62}{space 4} 22.21927{col 75}{space 3} 23.99711
{txt}{space 11}d_dist255 {c |}{col 22}{res}{space 2} 28.67802{col 34}{space 2} .2681684{col 45}{space 1}  106.94{col 54}{space 3}0.000{col 62}{space 4} 28.15018{col 75}{space 3} 29.20585
{txt}{space 11}d_dist256 {c |}{col 22}{res}{space 2}-2.975242{col 34}{space 2} .2551148{col 45}{space 1}  -11.66{col 54}{space 3}0.000{col 62}{space 4}-3.477383{col 75}{space 3}-2.473101
{txt}{space 11}d_dist257 {c |}{col 22}{res}{space 2} 47.86308{col 34}{space 2}  .368671{col 45}{space 1}  129.83{col 54}{space 3}0.000{col 62}{space 4} 47.13743{col 75}{space 3} 48.58873
{txt}{space 11}d_dist258 {c |}{col 22}{res}{space 2} 53.12493{col 34}{space 2} .8880662{col 45}{space 1}   59.82{col 54}{space 3}0.000{col 62}{space 4} 51.37696{col 75}{space 3} 54.87291
{txt}{space 11}d_dist259 {c |}{col 22}{res}{space 2} 29.49571{col 34}{space 2} .5097834{col 45}{space 1}   57.86{col 54}{space 3}0.000{col 62}{space 4}  28.4923{col 75}{space 3} 30.49911
{txt}{space 11}d_dist260 {c |}{col 22}{res}{space 2} 52.71321{col 34}{space 2} .2336136{col 45}{space 1}  225.64{col 54}{space 3}0.000{col 62}{space 4} 52.25339{col 75}{space 3} 53.17303
{txt}{space 11}d_dist261 {c |}{col 22}{res}{space 2} 67.81845{col 34}{space 2} .7672744{col 45}{space 1}   88.39{col 54}{space 3}0.000{col 62}{space 4} 66.30823{col 75}{space 3} 69.32867
{txt}{space 11}d_dist262 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist263 {c |}{col 22}{res}{space 2} 6.499183{col 34}{space 2} .0500374{col 45}{space 1}  129.89{col 54}{space 3}0.000{col 62}{space 4} 6.400695{col 75}{space 3} 6.597671
{txt}{space 11}d_dist264 {c |}{col 22}{res}{space 2}-5.988507{col 34}{space 2} .1097617{col 45}{space 1}  -54.56{col 54}{space 3}0.000{col 62}{space 4} -6.20455{col 75}{space 3}-5.772464
{txt}{space 11}d_dist265 {c |}{col 22}{res}{space 2}-29.62365{col 34}{space 2} .0455721{col 45}{space 1} -650.04{col 54}{space 3}0.000{col 62}{space 4}-29.71335{col 75}{space 3}-29.53395
{txt}{space 11}d_dist266 {c |}{col 22}{res}{space 2}-40.24622{col 34}{space 2}  .067547{col 45}{space 1} -595.83{col 54}{space 3}0.000{col 62}{space 4}-40.37917{col 75}{space 3}-40.11327
{txt}{space 11}d_dist267 {c |}{col 22}{res}{space 2}-39.83457{col 34}{space 2} .0459972{col 45}{space 1} -866.02{col 54}{space 3}0.000{col 62}{space 4}-39.92511{col 75}{space 3}-39.74404
{txt}{space 11}d_dist268 {c |}{col 22}{res}{space 2} 3.813778{col 34}{space 2}  .067547{col 45}{space 1}   56.46{col 54}{space 3}0.000{col 62}{space 4} 3.680826{col 75}{space 3}  3.94673
{txt}{space 11}d_dist269 {c |}{col 22}{res}{space 2}-45.54356{col 34}{space 2} .0235896{col 45}{space 1}-1930.66{col 54}{space 3}0.000{col 62}{space 4}   -45.59{col 75}{space 3}-45.49713
{txt}{space 11}d_dist270 {c |}{col 22}{res}{space 2}-57.15828{col 34}{space 2} .0234603{col 45}{space 1}-2436.38{col 54}{space 3}0.000{col 62}{space 4}-57.20446{col 75}{space 3}-57.11211
{txt}{space 11}d_dist271 {c |}{col 22}{res}{space 2}-18.27499{col 34}{space 2} .9031036{col 45}{space 1}  -20.24{col 54}{space 3}0.000{col 62}{space 4}-20.05256{col 75}{space 3}-16.49741
{txt}{space 11}d_dist272 {c |}{col 22}{res}{space 2} -13.5582{col 34}{space 2} .2682553{col 45}{space 1}  -50.54{col 54}{space 3}0.000{col 62}{space 4}-14.08621{col 75}{space 3} -13.0302
{txt}{space 11}d_dist273 {c |}{col 22}{res}{space 2}-11.78805{col 34}{space 2} .2713506{col 45}{space 1}  -43.44{col 54}{space 3}0.000{col 62}{space 4}-12.32214{col 75}{space 3}-11.25395
{txt}{space 11}d_dist274 {c |}{col 22}{res}{space 2} 14.31704{col 34}{space 2} 2.338055{col 45}{space 1}    6.12{col 54}{space 3}0.000{col 62}{space 4}  9.71506{col 75}{space 3} 18.91902
{txt}{space 11}d_dist275 {c |}{col 22}{res}{space 2} 9.866068{col 34}{space 2} 1.338435{col 45}{space 1}    7.37{col 54}{space 3}0.000{col 62}{space 4} 7.231636{col 75}{space 3}  12.5005
{txt}{space 11}d_dist276 {c |}{col 22}{res}{space 2}-19.14926{col 34}{space 2} .3920152{col 45}{space 1}  -48.85{col 54}{space 3}0.000{col 62}{space 4}-19.92086{col 75}{space 3}-18.37766
{txt}{space 11}d_dist277 {c |}{col 22}{res}{space 2}-40.28165{col 34}{space 2} .5308493{col 45}{space 1}  -75.88{col 54}{space 3}0.000{col 62}{space 4}-41.32652{col 75}{space 3}-39.23678
{txt}{space 11}d_dist278 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist279 {c |}{col 22}{res}{space 2}-16.89078{col 34}{space 2} .9277236{col 45}{space 1}  -18.21{col 54}{space 3}0.000{col 62}{space 4}-18.71681{col 75}{space 3}-15.06475
{txt}{space 11}d_dist280 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist281 {c |}{col 22}{res}{space 2}-30.55228{col 34}{space 2} .1258448{col 45}{space 1} -242.78{col 54}{space 3}0.000{col 62}{space 4}-30.79998{col 75}{space 3}-30.30458
{txt}{space 11}d_dist282 {c |}{col 22}{res}{space 2}-26.68984{col 34}{space 2}  .667213{col 45}{space 1}  -40.00{col 54}{space 3}0.000{col 62}{space 4}-28.00311{col 75}{space 3}-25.37657
{txt}{space 11}d_dist283 {c |}{col 22}{res}{space 2}-44.78178{col 34}{space 2} .3126402{col 45}{space 1} -143.24{col 54}{space 3}0.000{col 62}{space 4}-45.39715{col 75}{space 3}-44.16642
{txt}{space 11}d_dist284 {c |}{col 22}{res}{space 2} 9.649787{col 34}{space 2} .0543773{col 45}{space 1}  177.46{col 54}{space 3}0.000{col 62}{space 4} 9.542757{col 75}{space 3} 9.756818
{txt}{space 11}d_dist285 {c |}{col 22}{res}{space 2} 10.01165{col 34}{space 2} .7306901{col 45}{space 1}   13.70{col 54}{space 3}0.000{col 62}{space 4} 8.573442{col 75}{space 3} 11.44987
{txt}{space 11}d_dist286 {c |}{col 22}{res}{space 2}-35.63895{col 34}{space 2} .9222571{col 45}{space 1}  -38.64{col 54}{space 3}0.000{col 62}{space 4}-37.45422{col 75}{space 3}-33.82368
{txt}{space 11}d_dist287 {c |}{col 22}{res}{space 2}-12.70923{col 34}{space 2} .8818227{col 45}{space 1}  -14.41{col 54}{space 3}0.000{col 62}{space 4}-14.44491{col 75}{space 3}-10.97354
{txt}{space 15}inter {c |}{col 22}{res}{space 2}-.8016645{col 34}{space 2} .3703279{col 45}{space 1}   -2.16{col 54}{space 3}0.031{col 62}{space 4}-1.530578{col 75}{space 3}-.0727506
{txt}cum_capacity_turbine {c |}{col 22}{res}{space 2} -.003514{col 34}{space 2} .0032233{col 45}{space 1}   -1.09{col 54}{space 3}0.277{col 62}{space 4}-.0098584{col 75}{space 3} .0028304
{txt}{space 15}_cons {c |}{col 22}{res}{space 2} 30.72882{col 34}{space 2} 3.944296{col 45}{space 1}    7.79{col 54}{space 3}0.000{col 62}{space 4} 22.96529{col 75}{space 3} 38.49235
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{res}{txt}note: d_sy16 omitted because of collinearity
note: d_sy20 omitted because of collinearity
note: d_sy32 omitted because of collinearity
note: d_sy53 omitted because of collinearity
note: d_sy60 omitted because of collinearity
note: d_dist8 omitted because of collinearity
note: d_dist18 omitted because of collinearity
note: d_dist65 omitted because of collinearity
note: d_dist69 omitted because of collinearity
note: d_dist77 omitted because of collinearity
note: d_dist94 omitted because of collinearity
note: d_dist105 omitted because of collinearity
note: d_dist117 omitted because of collinearity
note: d_dist132 omitted because of collinearity
note: d_dist138 omitted because of collinearity
note: d_dist151 omitted because of collinearity
note: d_dist167 omitted because of collinearity
note: d_dist198 omitted because of collinearity
note: d_dist210 omitted because of collinearity
note: d_dist220 omitted because of collinearity
note: d_dist234 omitted because of collinearity
note: d_dist239 omitted because of collinearity
note: d_dist244 omitted because of collinearity
note: d_dist262 omitted because of collinearity
note: d_dist274 omitted because of collinearity
note: d_dist280 omitted because of collinearity

Linear regression                               Number of obs     = {res}     1,144
                                                {txt}{help j_robustsingular:F(70, 286) }       =  {res}        .
                                                {txt}Prob > F          = {res}         .
                                                {txt}R-squared         = {res}    0.8881
                                                {txt}Root MSE          =    {res} 8.9637

{txt}{ralign 83:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}repvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 12}d_sy1 {c |}{col 19}{res}{space 2} 29.00913{col 31}{space 2} 6.036981{col 42}{space 1}    4.81{col 51}{space 3}0.000{col 59}{space 4} 17.12658{col 72}{space 3} 40.89168
{txt}{space 12}d_sy2 {c |}{col 19}{res}{space 2} 21.23804{col 31}{space 2} 3.895938{col 42}{space 1}    5.45{col 51}{space 3}0.000{col 59}{space 4} 13.56969{col 72}{space 3} 28.90639
{txt}{space 12}d_sy3 {c |}{col 19}{res}{space 2}  16.0132{col 31}{space 2} 2.932499{col 42}{space 1}    5.46{col 51}{space 3}0.000{col 59}{space 4} 10.24118{col 72}{space 3} 21.78521
{txt}{space 12}d_sy4 {c |}{col 19}{res}{space 2} 25.30781{col 31}{space 2} 3.288789{col 42}{space 1}    7.70{col 51}{space 3}0.000{col 59}{space 4} 18.83451{col 72}{space 3} 31.78111
{txt}{space 12}d_sy5 {c |}{col 19}{res}{space 2} 38.12474{col 31}{space 2} 26.13348{col 42}{space 1}    1.46{col 51}{space 3}0.146{col 59}{space 4}-13.31361{col 72}{space 3} 89.56308
{txt}{space 12}d_sy6 {c |}{col 19}{res}{space 2}  37.8309{col 31}{space 2}  25.9102{col 42}{space 1}    1.46{col 51}{space 3}0.145{col 59}{space 4}-13.16798{col 72}{space 3} 88.82978
{txt}{space 12}d_sy7 {c |}{col 19}{res}{space 2} 35.51347{col 31}{space 2} 25.36156{col 42}{space 1}    1.40{col 51}{space 3}0.163{col 59}{space 4}-14.40551{col 72}{space 3} 85.43245
{txt}{space 12}d_sy8 {c |}{col 19}{res}{space 2} 46.02064{col 31}{space 2}  24.9678{col 42}{space 1}    1.84{col 51}{space 3}0.066{col 59}{space 4}-3.123316{col 72}{space 3} 95.16459
{txt}{space 12}d_sy9 {c |}{col 19}{res}{space 2} 30.12818{col 31}{space 2} 4.794914{col 42}{space 1}    6.28{col 51}{space 3}0.000{col 59}{space 4} 20.69038{col 72}{space 3} 39.56598
{txt}{space 11}d_sy10 {c |}{col 19}{res}{space 2}  24.0562{col 31}{space 2} 3.955777{col 42}{space 1}    6.08{col 51}{space 3}0.000{col 59}{space 4} 16.27007{col 72}{space 3} 31.84232
{txt}{space 11}d_sy11 {c |}{col 19}{res}{space 2} 30.81817{col 31}{space 2} 3.773343{col 42}{space 1}    8.17{col 51}{space 3}0.000{col 59}{space 4} 23.39112{col 72}{space 3} 38.24521
{txt}{space 11}d_sy12 {c |}{col 19}{res}{space 2} 42.33267{col 31}{space 2} 3.526686{col 42}{space 1}   12.00{col 51}{space 3}0.000{col 59}{space 4} 35.39112{col 72}{space 3} 49.27422
{txt}{space 11}d_sy13 {c |}{col 19}{res}{space 2} 3.540791{col 31}{space 2} 3.966963{col 42}{space 1}    0.89{col 51}{space 3}0.373{col 59}{space 4}-4.267355{col 72}{space 3} 11.34894
{txt}{space 11}d_sy14 {c |}{col 19}{res}{space 2} 5.169214{col 31}{space 2} 3.200592{col 42}{space 1}    1.62{col 51}{space 3}0.107{col 59}{space 4}-1.130489{col 72}{space 3} 11.46892
{txt}{space 11}d_sy15 {c |}{col 19}{res}{space 2}-6.265516{col 31}{space 2} 1.684873{col 42}{space 1}   -3.72{col 51}{space 3}0.000{col 59}{space 4} -9.58184{col 72}{space 3}-2.949193
{txt}{space 11}d_sy16 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 11}d_sy17 {c |}{col 19}{res}{space 2} -3.31424{col 31}{space 2} 9.483567{col 42}{space 1}   -0.35{col 51}{space 3}0.727{col 59}{space 4}-21.98068{col 72}{space 3}  15.3522
{txt}{space 11}d_sy18 {c |}{col 19}{res}{space 2}-12.05986{col 31}{space 2} 4.615658{col 42}{space 1}   -2.61{col 51}{space 3}0.009{col 59}{space 4}-21.14483{col 72}{space 3}-2.974894
{txt}{space 11}d_sy19 {c |}{col 19}{res}{space 2}-7.555243{col 31}{space 2} 1.396999{col 42}{space 1}   -5.41{col 51}{space 3}0.000{col 59}{space 4}-10.30495{col 72}{space 3}-4.805539
{txt}{space 11}d_sy20 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 11}d_sy21 {c |}{col 19}{res}{space 2} -6.51391{col 31}{space 2} 4.211343{col 42}{space 1}   -1.55{col 51}{space 3}0.123{col 59}{space 4}-14.80307{col 72}{space 3} 1.775249
{txt}{space 11}d_sy22 {c |}{col 19}{res}{space 2} -6.76568{col 31}{space 2} 2.840116{col 42}{space 1}   -2.38{col 51}{space 3}0.018{col 59}{space 4}-12.35586{col 72}{space 3}  -1.1755
{txt}{space 11}d_sy23 {c |}{col 19}{res}{space 2}-6.671948{col 31}{space 2} 3.350311{col 42}{space 1}   -1.99{col 51}{space 3}0.047{col 59}{space 4}-13.26634{col 72}{space 3}-.0775544
{txt}{space 11}d_sy24 {c |}{col 19}{res}{space 2} 6.271735{col 31}{space 2} 1.417411{col 42}{space 1}    4.42{col 51}{space 3}0.000{col 59}{space 4} 3.481855{col 72}{space 3} 9.061616
{txt}{space 11}d_sy25 {c |}{col 19}{res}{space 2} 36.21162{col 31}{space 2} 3.766383{col 42}{space 1}    9.61{col 51}{space 3}0.000{col 59}{space 4} 28.79827{col 72}{space 3} 43.62496
{txt}{space 11}d_sy26 {c |}{col 19}{res}{space 2} 32.17282{col 31}{space 2} 2.585356{col 42}{space 1}   12.44{col 51}{space 3}0.000{col 59}{space 4} 27.08408{col 72}{space 3} 37.26156
{txt}{space 11}d_sy27 {c |}{col 19}{res}{space 2}  32.0235{col 31}{space 2} 1.803131{col 42}{space 1}   17.76{col 51}{space 3}0.000{col 59}{space 4} 28.47441{col 72}{space 3} 35.57259
{txt}{space 11}d_sy28 {c |}{col 19}{res}{space 2} 47.48489{col 31}{space 2} 2.047219{col 42}{space 1}   23.19{col 51}{space 3}0.000{col 59}{space 4} 43.45536{col 72}{space 3} 51.51442
{txt}{space 11}d_sy29 {c |}{col 19}{res}{space 2} -13.5412{col 31}{space 2} 8.977979{col 42}{space 1}   -1.51{col 51}{space 3}0.133{col 59}{space 4} -31.2125{col 72}{space 3} 4.130091
{txt}{space 11}d_sy30 {c |}{col 19}{res}{space 2}-19.17357{col 31}{space 2}   7.7977{col 42}{space 1}   -2.46{col 51}{space 3}0.015{col 59}{space 4}-34.52173{col 72}{space 3}-3.825407
{txt}{space 11}d_sy31 {c |}{col 19}{res}{space 2}-9.531991{col 31}{space 2} 6.822499{col 42}{space 1}   -1.40{col 51}{space 3}0.163{col 59}{space 4}-22.96067{col 72}{space 3} 3.896687
{txt}{space 11}d_sy32 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 11}d_sy33 {c |}{col 19}{res}{space 2} 37.99426{col 31}{space 2} 3.856119{col 42}{space 1}    9.85{col 51}{space 3}0.000{col 59}{space 4} 30.40429{col 72}{space 3} 45.58423
{txt}{space 11}d_sy34 {c |}{col 19}{res}{space 2} 30.84797{col 31}{space 2} 4.595534{col 42}{space 1}    6.71{col 51}{space 3}0.000{col 59}{space 4} 21.80261{col 72}{space 3} 39.89333
{txt}{space 11}d_sy35 {c |}{col 19}{res}{space 2} 34.43042{col 31}{space 2} 2.296195{col 42}{space 1}   14.99{col 51}{space 3}0.000{col 59}{space 4} 29.91084{col 72}{space 3} 38.95001
{txt}{space 11}d_sy36 {c |}{col 19}{res}{space 2}  43.0249{col 31}{space 2} 2.059443{col 42}{space 1}   20.89{col 51}{space 3}0.000{col 59}{space 4} 38.97132{col 72}{space 3} 47.07849
{txt}{space 11}d_sy37 {c |}{col 19}{res}{space 2}-15.31575{col 31}{space 2} 6.396617{col 42}{space 1}   -2.39{col 51}{space 3}0.017{col 59}{space 4}-27.90617{col 72}{space 3}-2.725335
{txt}{space 11}d_sy38 {c |}{col 19}{res}{space 2}-18.96831{col 31}{space 2} 4.816757{col 42}{space 1}   -3.94{col 51}{space 3}0.000{col 59}{space 4} -28.4491{col 72}{space 3} -9.48752
{txt}{space 11}d_sy39 {c |}{col 19}{res}{space 2}-13.54921{col 31}{space 2} 5.042786{col 42}{space 1}   -2.69{col 51}{space 3}0.008{col 59}{space 4}-23.47489{col 72}{space 3}-3.623524
{txt}{space 11}d_sy40 {c |}{col 19}{res}{space 2} 14.63588{col 31}{space 2} 3.301087{col 42}{space 1}    4.43{col 51}{space 3}0.000{col 59}{space 4} 8.138368{col 72}{space 3} 21.13338
{txt}{space 11}d_sy41 {c |}{col 19}{res}{space 2} 42.66204{col 31}{space 2} 3.817613{col 42}{space 1}   11.18{col 51}{space 3}0.000{col 59}{space 4} 35.14786{col 72}{space 3} 50.17622
{txt}{space 11}d_sy42 {c |}{col 19}{res}{space 2} 39.28526{col 31}{space 2} 2.958255{col 42}{space 1}   13.28{col 51}{space 3}0.000{col 59}{space 4} 33.46254{col 72}{space 3} 45.10797
{txt}{space 11}d_sy43 {c |}{col 19}{res}{space 2} 44.05928{col 31}{space 2} 1.340197{col 42}{space 1}   32.88{col 51}{space 3}0.000{col 59}{space 4} 41.42138{col 72}{space 3} 46.69718
{txt}{space 11}d_sy44 {c |}{col 19}{res}{space 2}  55.7078{col 31}{space 2} 2.276135{col 42}{space 1}   24.47{col 51}{space 3}0.000{col 59}{space 4}  51.2277{col 72}{space 3}  60.1879
{txt}{space 11}d_sy45 {c |}{col 19}{res}{space 2} 25.57092{col 31}{space 2}  6.17821{col 42}{space 1}    4.14{col 51}{space 3}0.000{col 59}{space 4} 13.41039{col 72}{space 3} 37.73145
{txt}{space 11}d_sy46 {c |}{col 19}{res}{space 2} 26.97103{col 31}{space 2} 4.493041{col 42}{space 1}    6.00{col 51}{space 3}0.000{col 59}{space 4} 18.12741{col 72}{space 3} 35.81465
{txt}{space 11}d_sy47 {c |}{col 19}{res}{space 2} 27.02012{col 31}{space 2} 3.946423{col 42}{space 1}    6.85{col 51}{space 3}0.000{col 59}{space 4}  19.2524{col 72}{space 3} 34.78784
{txt}{space 11}d_sy48 {c |}{col 19}{res}{space 2} 40.13991{col 31}{space 2} 4.796863{col 42}{space 1}    8.37{col 51}{space 3}0.000{col 59}{space 4} 30.69827{col 72}{space 3} 49.58154
{txt}{space 11}d_sy49 {c |}{col 19}{res}{space 2} 36.69306{col 31}{space 2} 3.960006{col 42}{space 1}    9.27{col 51}{space 3}0.000{col 59}{space 4} 28.89861{col 72}{space 3} 44.48751
{txt}{space 11}d_sy50 {c |}{col 19}{res}{space 2} 35.57637{col 31}{space 2} 2.953684{col 42}{space 1}   12.04{col 51}{space 3}0.000{col 59}{space 4} 29.76265{col 72}{space 3} 41.39009
{txt}{space 11}d_sy51 {c |}{col 19}{res}{space 2} 34.86694{col 31}{space 2} 3.126103{col 42}{space 1}   11.15{col 51}{space 3}0.000{col 59}{space 4} 28.71385{col 72}{space 3} 41.02003
{txt}{space 11}d_sy52 {c |}{col 19}{res}{space 2} 51.66364{col 31}{space 2} 3.829928{col 42}{space 1}   13.49{col 51}{space 3}0.000{col 59}{space 4} 44.12522{col 72}{space 3} 59.20206
{txt}{space 11}d_sy53 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 11}d_sy54 {c |}{col 19}{res}{space 2}-5.421469{col 31}{space 2} 5.542868{col 42}{space 1}   -0.98{col 51}{space 3}0.329{col 59}{space 4}-16.33146{col 72}{space 3} 5.488521
{txt}{space 11}d_sy55 {c |}{col 19}{res}{space 2}-4.176275{col 31}{space 2} 4.421124{col 42}{space 1}   -0.94{col 51}{space 3}0.346{col 59}{space 4}-12.87834{col 72}{space 3} 4.525794
{txt}{space 11}d_sy56 {c |}{col 19}{res}{space 2} 5.252255{col 31}{space 2} 4.789072{col 42}{space 1}    1.10{col 51}{space 3}0.274{col 59}{space 4}-4.174043{col 72}{space 3} 14.67855
{txt}{space 11}d_sy57 {c |}{col 19}{res}{space 2} 1.171623{col 31}{space 2} 3.471741{col 42}{space 1}    0.34{col 51}{space 3}0.736{col 59}{space 4}-5.661781{col 72}{space 3} 8.005027
{txt}{space 11}d_sy58 {c |}{col 19}{res}{space 2}-10.77666{col 31}{space 2} 2.481098{col 42}{space 1}   -4.34{col 51}{space 3}0.000{col 59}{space 4}-15.66019{col 72}{space 3}-5.893133
{txt}{space 11}d_sy59 {c |}{col 19}{res}{space 2}-11.19504{col 31}{space 2} 1.150628{col 42}{space 1}   -9.73{col 51}{space 3}0.000{col 59}{space 4}-13.45981{col 72}{space 3}-8.930269
{txt}{space 11}d_sy60 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 11}d_sy61 {c |}{col 19}{res}{space 2} .1052956{col 31}{space 2} 4.390332{col 42}{space 1}    0.02{col 51}{space 3}0.981{col 59}{space 4}-8.536165{col 72}{space 3} 8.746756
{txt}{space 11}d_sy62 {c |}{col 19}{res}{space 2}-2.520082{col 31}{space 2} 3.618059{col 42}{space 1}   -0.70{col 51}{space 3}0.487{col 59}{space 4}-9.641482{col 72}{space 3} 4.601319
{txt}{space 11}d_sy63 {c |}{col 19}{res}{space 2} 1.827367{col 31}{space 2}  2.36848{col 42}{space 1}    0.77{col 51}{space 3}0.441{col 59}{space 4}-2.834496{col 72}{space 3}  6.48923
{txt}{space 11}d_sy64 {c |}{col 19}{res}{space 2} 11.68482{col 31}{space 2}  1.85136{col 42}{space 1}    6.31{col 51}{space 3}0.000{col 59}{space 4} 8.040797{col 72}{space 3} 15.32884
{txt}{space 11}d_sy65 {c |}{col 19}{res}{space 2} 30.92224{col 31}{space 2} 3.733414{col 42}{space 1}    8.28{col 51}{space 3}0.000{col 59}{space 4} 23.57378{col 72}{space 3} 38.27069
{txt}{space 11}d_sy66 {c |}{col 19}{res}{space 2} 24.16315{col 31}{space 2} 2.929329{col 42}{space 1}    8.25{col 51}{space 3}0.000{col 59}{space 4} 18.39737{col 72}{space 3} 29.92893
{txt}{space 11}d_sy67 {c |}{col 19}{res}{space 2} 29.37695{col 31}{space 2} 1.941293{col 42}{space 1}   15.13{col 51}{space 3}0.000{col 59}{space 4} 25.55592{col 72}{space 3} 33.19799
{txt}{space 11}d_sy68 {c |}{col 19}{res}{space 2}  38.9438{col 31}{space 2} 2.302468{col 42}{space 1}   16.91{col 51}{space 3}0.000{col 59}{space 4} 34.41187{col 72}{space 3} 43.47574
{txt}{space 11}d_sy69 {c |}{col 19}{res}{space 2} 38.25049{col 31}{space 2} 4.315877{col 42}{space 1}    8.86{col 51}{space 3}0.000{col 59}{space 4} 29.75558{col 72}{space 3}  46.7454
{txt}{space 11}d_sy70 {c |}{col 19}{res}{space 2} 34.49295{col 31}{space 2} 3.999026{col 42}{space 1}    8.63{col 51}{space 3}0.000{col 59}{space 4}  26.6217{col 72}{space 3} 42.36421
{txt}{space 11}d_sy71 {c |}{col 19}{res}{space 2} 36.21542{col 31}{space 2} 2.631405{col 42}{space 1}   13.76{col 51}{space 3}0.000{col 59}{space 4} 31.03604{col 72}{space 3} 41.39479
{txt}{space 11}d_sy72 {c |}{col 19}{res}{space 2} 47.21608{col 31}{space 2}   2.3137{col 42}{space 1}   20.41{col 51}{space 3}0.000{col 59}{space 4} 42.66204{col 72}{space 3} 51.77012
{txt}{space 11}d_sy73 {c |}{col 19}{res}{space 2}-.8684145{col 31}{space 2} 6.307909{col 42}{space 1}   -0.14{col 51}{space 3}0.891{col 59}{space 4}-13.28423{col 72}{space 3}  11.5474
{txt}{space 11}d_sy74 {c |}{col 19}{res}{space 2}-1.123457{col 31}{space 2} 3.255949{col 42}{space 1}   -0.35{col 51}{space 3}0.730{col 59}{space 4} -7.53212{col 72}{space 3} 5.285206
{txt}{space 11}d_sy75 {c |}{col 19}{res}{space 2} 1.980021{col 31}{space 2} 2.157391{col 42}{space 1}    0.92{col 51}{space 3}0.360{col 59}{space 4}-2.266358{col 72}{space 3} 6.226399
{txt}{space 11}d_sy76 {c |}{col 19}{res}{space 2} 13.13701{col 31}{space 2} 1.423232{col 42}{space 1}    9.23{col 51}{space 3}0.000{col 59}{space 4} 10.33567{col 72}{space 3} 15.93835
{txt}{space 11}d_sy77 {c |}{col 19}{res}{space 2} 5.977145{col 31}{space 2} 6.979376{col 42}{space 1}    0.86{col 51}{space 3}0.392{col 59}{space 4}-7.760314{col 72}{space 3}  19.7146
{txt}{space 11}d_sy78 {c |}{col 19}{res}{space 2} -5.04754{col 31}{space 2} 4.817526{col 42}{space 1}   -1.05{col 51}{space 3}0.296{col 59}{space 4}-14.52984{col 72}{space 3} 4.434764
{txt}{space 11}d_sy79 {c |}{col 19}{res}{space 2} 1.852186{col 31}{space 2} 3.253209{col 42}{space 1}    0.57{col 51}{space 3}0.570{col 59}{space 4}-4.551083{col 72}{space 3} 8.255455
{txt}{space 11}d_sy80 {c |}{col 19}{res}{space 2} 21.64256{col 31}{space 2} 5.344459{col 42}{space 1}    4.05{col 51}{space 3}0.000{col 59}{space 4} 11.12309{col 72}{space 3} 32.16202
{txt}{space 11}d_sy81 {c |}{col 19}{res}{space 2} 50.95654{col 31}{space 2} 6.978262{col 42}{space 1}    7.30{col 51}{space 3}0.000{col 59}{space 4} 37.22127{col 72}{space 3}  64.6918
{txt}{space 11}d_sy82 {c |}{col 19}{res}{space 2}  51.3302{col 31}{space 2} 6.225494{col 42}{space 1}    8.25{col 51}{space 3}0.000{col 59}{space 4}  39.0766{col 72}{space 3}  63.5838
{txt}{space 11}d_sy83 {c |}{col 19}{res}{space 2} 39.83573{col 31}{space 2} 8.448361{col 42}{space 1}    4.72{col 51}{space 3}0.000{col 59}{space 4} 23.20688{col 72}{space 3} 56.46458
{txt}{space 11}d_sy84 {c |}{col 19}{res}{space 2} 63.05538{col 31}{space 2} 5.593044{col 42}{space 1}   11.27{col 51}{space 3}0.000{col 59}{space 4} 52.04663{col 72}{space 3} 74.06413
{txt}{space 11}d_sy85 {c |}{col 19}{res}{space 2}-17.12078{col 31}{space 2} 6.279421{col 42}{space 1}   -2.73{col 51}{space 3}0.007{col 59}{space 4}-29.48053{col 72}{space 3}-4.761043
{txt}{space 11}d_sy86 {c |}{col 19}{res}{space 2}-23.20318{col 31}{space 2} 3.639698{col 42}{space 1}   -6.38{col 51}{space 3}0.000{col 59}{space 4}-30.36717{col 72}{space 3}-16.03918
{txt}{space 11}d_sy87 {c |}{col 19}{res}{space 2}-19.67235{col 31}{space 2} 3.192396{col 42}{space 1}   -6.16{col 51}{space 3}0.000{col 59}{space 4}-25.95592{col 72}{space 3}-13.38878
{txt}{space 11}d_sy88 {c |}{col 19}{res}{space 2}-9.868741{col 31}{space 2} 2.520441{col 42}{space 1}   -3.92{col 51}{space 3}0.000{col 59}{space 4}-14.82971{col 72}{space 3}-4.907775
{txt}{space 11}d_sy89 {c |}{col 19}{res}{space 2} 45.30236{col 31}{space 2} 4.931532{col 42}{space 1}    9.19{col 51}{space 3}0.000{col 59}{space 4} 35.59566{col 72}{space 3} 55.00906
{txt}{space 11}d_sy90 {c |}{col 19}{res}{space 2}  40.4931{col 31}{space 2} 3.827555{col 42}{space 1}   10.58{col 51}{space 3}0.000{col 59}{space 4} 32.95935{col 72}{space 3} 48.02685
{txt}{space 11}d_sy91 {c |}{col 19}{res}{space 2}  36.1905{col 31}{space 2} 5.610855{col 42}{space 1}    6.45{col 51}{space 3}0.000{col 59}{space 4} 25.14669{col 72}{space 3} 47.23431
{txt}{space 11}d_sy92 {c |}{col 19}{res}{space 2} 60.30346{col 31}{space 2} 5.381646{col 42}{space 1}   11.21{col 51}{space 3}0.000{col 59}{space 4}  49.7108{col 72}{space 3} 70.89612
{txt}{space 11}d_sy93 {c |}{col 19}{res}{space 2} 35.53504{col 31}{space 2} 4.544862{col 42}{space 1}    7.82{col 51}{space 3}0.000{col 59}{space 4} 26.58942{col 72}{space 3} 44.48067
{txt}{space 11}d_sy94 {c |}{col 19}{res}{space 2} 36.51765{col 31}{space 2} 3.589045{col 42}{space 1}   10.17{col 51}{space 3}0.000{col 59}{space 4} 29.45336{col 72}{space 3} 43.58195
{txt}{space 11}d_sy95 {c |}{col 19}{res}{space 2} 41.24859{col 31}{space 2} 2.855735{col 42}{space 1}   14.44{col 51}{space 3}0.000{col 59}{space 4} 35.62766{col 72}{space 3} 46.86951
{txt}{space 11}d_sy96 {c |}{col 19}{res}{space 2} 48.90747{col 31}{space 2} 3.972108{col 42}{space 1}   12.31{col 51}{space 3}0.000{col 59}{space 4}  41.0892{col 72}{space 3} 56.72575
{txt}{space 11}d_sy97 {c |}{col 19}{res}{space 2} 33.53751{col 31}{space 2} 7.361787{col 42}{space 1}    4.56{col 51}{space 3}0.000{col 59}{space 4} 19.04736{col 72}{space 3} 48.02767
{txt}{space 11}d_sy98 {c |}{col 19}{res}{space 2} 39.78796{col 31}{space 2} 4.807841{col 42}{space 1}    8.28{col 51}{space 3}0.000{col 59}{space 4} 30.32472{col 72}{space 3}  49.2512
{txt}{space 11}d_sy99 {c |}{col 19}{res}{space 2} 38.53714{col 31}{space 2} 5.575995{col 42}{space 1}    6.91{col 51}{space 3}0.000{col 59}{space 4} 27.56194{col 72}{space 3} 49.51233
{txt}{space 10}d_sy100 {c |}{col 19}{res}{space 2}  48.3304{col 31}{space 2} 3.229556{col 42}{space 1}   14.97{col 51}{space 3}0.000{col 59}{space 4} 41.97369{col 72}{space 3} 54.68712
{txt}{space 10}d_dist1 {c |}{col 19}{res}{space 2} 2.884998{col 31}{space 2} .0969222{col 42}{space 1}   29.77{col 51}{space 3}0.000{col 59}{space 4} 2.694227{col 72}{space 3}  3.07577
{txt}{space 10}d_dist2 {c |}{col 19}{res}{space 2} 12.53538{col 31}{space 2} .0471334{col 42}{space 1}  265.96{col 51}{space 3}0.000{col 59}{space 4} 12.44261{col 72}{space 3} 12.62815
{txt}{space 10}d_dist3 {c |}{col 19}{res}{space 2} 17.63945{col 31}{space 2} .3633867{col 42}{space 1}   48.54{col 51}{space 3}0.000{col 59}{space 4}  16.9242{col 72}{space 3}  18.3547
{txt}{space 10}d_dist4 {c |}{col 19}{res}{space 2}-25.27581{col 31}{space 2} .6225443{col 42}{space 1}  -40.60{col 51}{space 3}0.000{col 59}{space 4}-26.50116{col 72}{space 3}-24.05046
{txt}{space 10}d_dist5 {c |}{col 19}{res}{space 2} 1.827711{col 31}{space 2} .2199045{col 42}{space 1}    8.31{col 51}{space 3}0.000{col 59}{space 4} 1.394874{col 72}{space 3} 2.260548
{txt}{space 10}d_dist6 {c |}{col 19}{res}{space 2} 33.52573{col 31}{space 2}   .05288{col 42}{space 1}  634.00{col 51}{space 3}0.000{col 59}{space 4} 33.42165{col 72}{space 3} 33.62982
{txt}{space 10}d_dist7 {c |}{col 19}{res}{space 2}-12.42816{col 31}{space 2} .3740811{col 42}{space 1}  -33.22{col 51}{space 3}0.000{col 59}{space 4}-13.16446{col 72}{space 3}-11.69186
{txt}{space 10}d_dist8 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 10}d_dist9 {c |}{col 19}{res}{space 2}-37.20963{col 31}{space 2} 24.76452{col 42}{space 1}   -1.50{col 51}{space 3}0.134{col 59}{space 4}-85.95346{col 72}{space 3} 11.53421
{txt}{space 9}d_dist10 {c |}{col 19}{res}{space 2}-4.452478{col 31}{space 2} 24.74645{col 42}{space 1}   -0.18{col 51}{space 3}0.857{col 59}{space 4}-53.16075{col 72}{space 3} 44.25579
{txt}{space 9}d_dist11 {c |}{col 19}{res}{space 2}-8.460708{col 31}{space 2} 24.83642{col 42}{space 1}   -0.34{col 51}{space 3}0.734{col 59}{space 4}-57.34606{col 72}{space 3} 40.42465
{txt}{space 9}d_dist12 {c |}{col 19}{res}{space 2}-8.333406{col 31}{space 2} 24.79539{col 42}{space 1}   -0.34{col 51}{space 3}0.737{col 59}{space 4}  -57.138{col 72}{space 3} 40.47118
{txt}{space 9}d_dist13 {c |}{col 19}{res}{space 2}-42.59307{col 31}{space 2} 24.75686{col 42}{space 1}   -1.72{col 51}{space 3}0.086{col 59}{space 4}-91.32183{col 72}{space 3} 6.135691
{txt}{space 9}d_dist14 {c |}{col 19}{res}{space 2}-38.65795{col 31}{space 2} 24.85088{col 42}{space 1}   -1.56{col 51}{space 3}0.121{col 59}{space 4}-87.57178{col 72}{space 3} 10.25588
{txt}{space 9}d_dist15 {c |}{col 19}{res}{space 2}-45.57442{col 31}{space 2} 25.01208{col 42}{space 1}   -1.82{col 51}{space 3}0.069{col 59}{space 4}-94.80552{col 72}{space 3} 3.656685
{txt}{space 9}d_dist16 {c |}{col 19}{res}{space 2}-52.34401{col 31}{space 2} 25.00901{col 42}{space 1}   -2.09{col 51}{space 3}0.037{col 59}{space 4}-101.5691{col 72}{space 3}-3.118947
{txt}{space 9}d_dist17 {c |}{col 19}{res}{space 2}-56.15367{col 31}{space 2}  24.6866{col 42}{space 1}   -2.27{col 51}{space 3}0.024{col 59}{space 4}-104.7441{col 72}{space 3}-7.563201
{txt}{space 9}d_dist18 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 9}d_dist19 {c |}{col 19}{res}{space 2}-8.275694{col 31}{space 2} 17.96641{col 42}{space 1}   -0.46{col 51}{space 3}0.645{col 59}{space 4}-43.63885{col 72}{space 3} 27.08746
{txt}{space 9}d_dist20 {c |}{col 19}{res}{space 2} -43.4735{col 31}{space 2} 24.91042{col 42}{space 1}   -1.75{col 51}{space 3}0.082{col 59}{space 4}-92.50451{col 72}{space 3} 5.557523
{txt}{space 9}d_dist21 {c |}{col 19}{res}{space 2}-41.88649{col 31}{space 2} 24.70995{col 42}{space 1}   -1.70{col 51}{space 3}0.091{col 59}{space 4}-90.52292{col 72}{space 3} 6.749942
{txt}{space 9}d_dist22 {c |}{col 19}{res}{space 2}-40.68801{col 31}{space 2} 24.72806{col 42}{space 1}   -1.65{col 51}{space 3}0.101{col 59}{space 4}-89.36008{col 72}{space 3} 7.984058
{txt}{space 9}d_dist23 {c |}{col 19}{res}{space 2} -39.4962{col 31}{space 2} 24.66136{col 42}{space 1}   -1.60{col 51}{space 3}0.110{col 59}{space 4}  -88.037{col 72}{space 3} 9.044598
{txt}{space 9}d_dist24 {c |}{col 19}{res}{space 2} -41.1412{col 31}{space 2} 24.66136{col 42}{space 1}   -1.67{col 51}{space 3}0.096{col 59}{space 4}  -89.682{col 72}{space 3} 7.399598
{txt}{space 9}d_dist25 {c |}{col 19}{res}{space 2}-39.52564{col 31}{space 2} 24.73973{col 42}{space 1}   -1.60{col 51}{space 3}0.111{col 59}{space 4}-88.22069{col 72}{space 3} 9.169412
{txt}{space 9}d_dist26 {c |}{col 19}{res}{space 2}-38.72548{col 31}{space 2} 23.83434{col 42}{space 1}   -1.62{col 51}{space 3}0.105{col 59}{space 4}-85.63846{col 72}{space 3} 8.187495
{txt}{space 9}d_dist27 {c |}{col 19}{res}{space 2} 6.554508{col 31}{space 2} 24.68218{col 42}{space 1}    0.27{col 51}{space 3}0.791{col 59}{space 4}-42.02726{col 72}{space 3} 55.13627
{txt}{space 9}d_dist28 {c |}{col 19}{res}{space 2}-37.42572{col 31}{space 2} 24.67004{col 42}{space 1}   -1.52{col 51}{space 3}0.130{col 59}{space 4}-85.98359{col 72}{space 3} 11.13216
{txt}{space 9}d_dist29 {c |}{col 19}{res}{space 2} 10.40858{col 31}{space 2} 24.71594{col 42}{space 1}    0.42{col 51}{space 3}0.674{col 59}{space 4}-38.23963{col 72}{space 3} 59.05679
{txt}{space 9}d_dist30 {c |}{col 19}{res}{space 2} 54.90662{col 31}{space 2} 1.861103{col 42}{space 1}   29.50{col 51}{space 3}0.000{col 59}{space 4} 51.24343{col 72}{space 3} 58.56982
{txt}{space 9}d_dist31 {c |}{col 19}{res}{space 2}-29.09704{col 31}{space 2} 25.13765{col 42}{space 1}   -1.16{col 51}{space 3}0.248{col 59}{space 4} -78.5753{col 72}{space 3} 20.38123
{txt}{space 9}d_dist32 {c |}{col 19}{res}{space 2}-4.640751{col 31}{space 2} 24.91046{col 42}{space 1}   -0.19{col 51}{space 3}0.852{col 59}{space 4}-53.67184{col 72}{space 3} 44.39034
{txt}{space 9}d_dist33 {c |}{col 19}{res}{space 2}-3.545769{col 31}{space 2} 24.97617{col 42}{space 1}   -0.14{col 51}{space 3}0.887{col 59}{space 4}-52.70619{col 72}{space 3} 45.61465
{txt}{space 9}d_dist34 {c |}{col 19}{res}{space 2}-7.584356{col 31}{space 2} 24.96384{col 42}{space 1}   -0.30{col 51}{space 3}0.761{col 59}{space 4}-56.72051{col 72}{space 3}  41.5518
{txt}{space 9}d_dist35 {c |}{col 19}{res}{space 2}-32.79291{col 31}{space 2} 25.10464{col 42}{space 1}   -1.31{col 51}{space 3}0.193{col 59}{space 4}-82.20621{col 72}{space 3} 16.62039
{txt}{space 9}d_dist36 {c |}{col 19}{res}{space 2}-49.45649{col 31}{space 2} 24.76928{col 42}{space 1}   -2.00{col 51}{space 3}0.047{col 59}{space 4} -98.2097{col 72}{space 3}-.7032849
{txt}{space 9}d_dist37 {c |}{col 19}{res}{space 2}-36.73452{col 31}{space 2} 24.67608{col 42}{space 1}   -1.49{col 51}{space 3}0.138{col 59}{space 4}-85.30428{col 72}{space 3} 11.83524
{txt}{space 9}d_dist38 {c |}{col 19}{res}{space 2}-41.50935{col 31}{space 2} 25.26218{col 42}{space 1}   -1.64{col 51}{space 3}0.101{col 59}{space 4}-91.23274{col 72}{space 3} 8.214034
{txt}{space 9}d_dist39 {c |}{col 19}{res}{space 2} -58.6387{col 31}{space 2} 24.66136{col 42}{space 1}   -2.38{col 51}{space 3}0.018{col 59}{space 4}-107.1795{col 72}{space 3} -10.0979
{txt}{space 9}d_dist40 {c |}{col 19}{res}{space 2} -60.3737{col 31}{space 2} 24.66377{col 42}{space 1}   -2.45{col 51}{space 3}0.015{col 59}{space 4}-108.9192{col 72}{space 3}-11.82817
{txt}{space 9}d_dist41 {c |}{col 19}{res}{space 2} -36.0437{col 31}{space 2} 24.66136{col 42}{space 1}   -1.46{col 51}{space 3}0.145{col 59}{space 4} -84.5845{col 72}{space 3}  12.4971
{txt}{space 9}d_dist42 {c |}{col 19}{res}{space 2} -44.0337{col 31}{space 2} 24.66136{col 42}{space 1}   -1.79{col 51}{space 3}0.075{col 59}{space 4} -92.5745{col 72}{space 3} 4.507098
{txt}{space 9}d_dist43 {c |}{col 19}{res}{space 2} -55.0637{col 31}{space 2} 24.66136{col 42}{space 1}   -2.23{col 51}{space 3}0.026{col 59}{space 4}-103.6045{col 72}{space 3}-6.522902
{txt}{space 9}d_dist44 {c |}{col 19}{res}{space 2}-33.14592{col 31}{space 2} 24.70302{col 42}{space 1}   -1.34{col 51}{space 3}0.181{col 59}{space 4}-81.76871{col 72}{space 3} 15.47687
{txt}{space 9}d_dist45 {c |}{col 19}{res}{space 2} -55.9912{col 31}{space 2} 24.66136{col 42}{space 1}   -2.27{col 51}{space 3}0.024{col 59}{space 4} -104.532{col 72}{space 3}-7.450402
{txt}{space 9}d_dist46 {c |}{col 19}{res}{space 2}-54.73706{col 31}{space 2} 24.67365{col 42}{space 1}   -2.22{col 51}{space 3}0.027{col 59}{space 4} -103.302{col 72}{space 3}-6.172076
{txt}{space 9}d_dist47 {c |}{col 19}{res}{space 2} -33.1912{col 31}{space 2} 24.66136{col 42}{space 1}   -1.35{col 51}{space 3}0.179{col 59}{space 4}  -81.732{col 72}{space 3}  15.3496
{txt}{space 9}d_dist48 {c |}{col 19}{res}{space 2} -.840145{col 31}{space 2} 24.70944{col 42}{space 1}   -0.03{col 51}{space 3}0.973{col 59}{space 4}-49.47557{col 72}{space 3} 47.79528
{txt}{space 9}d_dist49 {c |}{col 19}{res}{space 2}  17.6066{col 31}{space 2} 17.38062{col 42}{space 1}    1.01{col 51}{space 3}0.312{col 59}{space 4}-16.60356{col 72}{space 3} 51.81675
{txt}{space 9}d_dist50 {c |}{col 19}{res}{space 2}   8.1305{col 31}{space 2} 24.97658{col 42}{space 1}    0.33{col 51}{space 3}0.745{col 59}{space 4}-41.03074{col 72}{space 3} 57.29174
{txt}{space 9}d_dist51 {c |}{col 19}{res}{space 2}-29.70751{col 31}{space 2} 25.32725{col 42}{space 1}   -1.17{col 51}{space 3}0.242{col 59}{space 4}-79.55896{col 72}{space 3} 20.14394
{txt}{space 9}d_dist52 {c |}{col 19}{res}{space 2}-8.108983{col 31}{space 2} 24.86486{col 42}{space 1}   -0.33{col 51}{space 3}0.745{col 59}{space 4}-57.05033{col 72}{space 3} 40.83236
{txt}{space 9}d_dist53 {c |}{col 19}{res}{space 2} 3.775386{col 31}{space 2} 17.91148{col 42}{space 1}    0.21{col 51}{space 3}0.833{col 59}{space 4}-31.47966{col 72}{space 3} 39.03043
{txt}{space 9}d_dist54 {c |}{col 19}{res}{space 2}-5.811349{col 31}{space 2} 24.75675{col 42}{space 1}   -0.23{col 51}{space 3}0.815{col 59}{space 4}-54.53989{col 72}{space 3} 42.91719
{txt}{space 9}d_dist55 {c |}{col 19}{res}{space 2} -30.9687{col 31}{space 2} 24.66136{col 42}{space 1}   -1.26{col 51}{space 3}0.210{col 59}{space 4} -79.5095{col 72}{space 3}  17.5721
{txt}{space 9}d_dist56 {c |}{col 19}{res}{space 2}-5.002565{col 31}{space 2}  24.7306{col 42}{space 1}   -0.20{col 51}{space 3}0.840{col 59}{space 4}-53.67963{col 72}{space 3}  43.6745
{txt}{space 9}d_dist57 {c |}{col 19}{res}{space 2}-2.188302{col 31}{space 2} 24.82793{col 42}{space 1}   -0.09{col 51}{space 3}0.930{col 59}{space 4}-51.05695{col 72}{space 3} 46.68035
{txt}{space 9}d_dist58 {c |}{col 19}{res}{space 2} -10.5212{col 31}{space 2} 24.66136{col 42}{space 1}   -0.43{col 51}{space 3}0.670{col 59}{space 4}  -59.062{col 72}{space 3}  38.0196
{txt}{space 9}d_dist59 {c |}{col 19}{res}{space 2}-32.47032{col 31}{space 2} 24.97258{col 42}{space 1}   -1.30{col 51}{space 3}0.195{col 59}{space 4}-81.62369{col 72}{space 3} 16.68304
{txt}{space 9}d_dist60 {c |}{col 19}{res}{space 2} 1.217548{col 31}{space 2} 24.96822{col 42}{space 1}    0.05{col 51}{space 3}0.961{col 59}{space 4}-47.92723{col 72}{space 3} 50.36232
{txt}{space 9}d_dist61 {c |}{col 19}{res}{space 2}-36.25236{col 31}{space 2} 24.67707{col 42}{space 1}   -1.47{col 51}{space 3}0.143{col 59}{space 4}-84.82407{col 72}{space 3} 12.31935
{txt}{space 9}d_dist62 {c |}{col 19}{res}{space 2}-39.45944{col 31}{space 2} 3.080015{col 42}{space 1}  -12.81{col 51}{space 3}0.000{col 59}{space 4}-45.52181{col 72}{space 3}-33.39706
{txt}{space 9}d_dist63 {c |}{col 19}{res}{space 2}-24.65989{col 31}{space 2} 2.946553{col 42}{space 1}   -8.37{col 51}{space 3}0.000{col 59}{space 4}-30.45957{col 72}{space 3}-18.86021
{txt}{space 9}d_dist64 {c |}{col 19}{res}{space 2}-14.78097{col 31}{space 2} 2.970146{col 42}{space 1}   -4.98{col 51}{space 3}0.000{col 59}{space 4}-20.62709{col 72}{space 3}-8.934855
{txt}{space 9}d_dist65 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 9}d_dist66 {c |}{col 19}{res}{space 2} 8.043246{col 31}{space 2} 2.873948{col 42}{space 1}    2.80{col 51}{space 3}0.005{col 59}{space 4} 2.386474{col 72}{space 3} 13.70002
{txt}{space 9}d_dist67 {c |}{col 19}{res}{space 2} 5.521676{col 31}{space 2} 2.853807{col 42}{space 1}    1.93{col 51}{space 3}0.054{col 59}{space 4}-.0954529{col 72}{space 3} 11.13881
{txt}{space 9}d_dist68 {c |}{col 19}{res}{space 2}-12.64501{col 31}{space 2} 2.865331{col 42}{space 1}   -4.41{col 51}{space 3}0.000{col 59}{space 4}-18.28483{col 72}{space 3}-7.005203
{txt}{space 9}d_dist69 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 9}d_dist70 {c |}{col 19}{res}{space 2} 4.202569{col 31}{space 2} .3988759{col 42}{space 1}   10.54{col 51}{space 3}0.000{col 59}{space 4} 3.417464{col 72}{space 3} 4.987674
{txt}{space 9}d_dist71 {c |}{col 19}{res}{space 2} 35.54723{col 31}{space 2}  3.02031{col 42}{space 1}   11.77{col 51}{space 3}0.000{col 59}{space 4} 29.60238{col 72}{space 3} 41.49209
{txt}{space 9}d_dist72 {c |}{col 19}{res}{space 2} 50.14929{col 31}{space 2} 3.070681{col 42}{space 1}   16.33{col 51}{space 3}0.000{col 59}{space 4} 44.10529{col 72}{space 3} 56.19329
{txt}{space 9}d_dist73 {c |}{col 19}{res}{space 2}-7.022635{col 31}{space 2} .8077753{col 42}{space 1}   -8.69{col 51}{space 3}0.000{col 59}{space 4}-8.612574{col 72}{space 3}-5.432696
{txt}{space 9}d_dist74 {c |}{col 19}{res}{space 2}-13.10662{col 31}{space 2} .8081278{col 42}{space 1}  -16.22{col 51}{space 3}0.000{col 59}{space 4}-14.69725{col 72}{space 3}-11.51599
{txt}{space 9}d_dist75 {c |}{col 19}{res}{space 2} 1.785881{col 31}{space 2} .8081278{col 42}{space 1}    2.21{col 51}{space 3}0.028{col 59}{space 4}  .195248{col 72}{space 3} 3.376513
{txt}{space 9}d_dist76 {c |}{col 19}{res}{space 2}-8.689119{col 31}{space 2} .8081278{col 42}{space 1}  -10.75{col 51}{space 3}0.000{col 59}{space 4}-10.27975{col 72}{space 3}-7.098487
{txt}{space 9}d_dist77 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 9}d_dist78 {c |}{col 19}{res}{space 2} 34.74875{col 31}{space 2} .8082771{col 42}{space 1}   42.99{col 51}{space 3}0.000{col 59}{space 4} 33.15782{col 72}{space 3} 36.33968
{txt}{space 9}d_dist79 {c |}{col 19}{res}{space 2}-7.720695{col 31}{space 2} .8078777{col 42}{space 1}   -9.56{col 51}{space 3}0.000{col 59}{space 4}-9.310835{col 72}{space 3}-6.130554
{txt}{space 9}d_dist80 {c |}{col 19}{res}{space 2} 24.63456{col 31}{space 2} .9470499{col 42}{space 1}   26.01{col 51}{space 3}0.000{col 59}{space 4} 22.77048{col 72}{space 3} 26.49863
{txt}{space 9}d_dist81 {c |}{col 19}{res}{space 2} 3.878347{col 31}{space 2} .8134067{col 42}{space 1}    4.77{col 51}{space 3}0.000{col 59}{space 4} 2.277324{col 72}{space 3}  5.47937
{txt}{space 9}d_dist82 {c |}{col 19}{res}{space 2} 33.25919{col 31}{space 2} .8281944{col 42}{space 1}   40.16{col 51}{space 3}0.000{col 59}{space 4} 31.62906{col 72}{space 3} 34.88932
{txt}{space 9}d_dist83 {c |}{col 19}{res}{space 2} 31.34366{col 31}{space 2} 1.173654{col 42}{space 1}   26.71{col 51}{space 3}0.000{col 59}{space 4} 29.03356{col 72}{space 3} 33.65375
{txt}{space 9}d_dist84 {c |}{col 19}{res}{space 2} .7968551{col 31}{space 2} .8084328{col 42}{space 1}    0.99{col 51}{space 3}0.325{col 59}{space 4}-.7943778{col 72}{space 3} 2.388088
{txt}{space 9}d_dist85 {c |}{col 19}{res}{space 2} 38.24417{col 31}{space 2} .8089027{col 42}{space 1}   47.28{col 51}{space 3}0.000{col 59}{space 4} 36.65201{col 72}{space 3} 39.83632
{txt}{space 9}d_dist86 {c |}{col 19}{res}{space 2} 35.07447{col 31}{space 2} 1.020275{col 42}{space 1}   34.38{col 51}{space 3}0.000{col 59}{space 4} 33.06627{col 72}{space 3} 37.08267
{txt}{space 9}d_dist87 {c |}{col 19}{res}{space 2} 41.01121{col 31}{space 2} 1.176505{col 42}{space 1}   34.86{col 51}{space 3}0.000{col 59}{space 4} 38.69551{col 72}{space 3} 43.32692
{txt}{space 9}d_dist88 {c |}{col 19}{res}{space 2} 44.91356{col 31}{space 2} .8732708{col 42}{space 1}   51.43{col 51}{space 3}0.000{col 59}{space 4} 43.19471{col 72}{space 3} 46.63242
{txt}{space 9}d_dist89 {c |}{col 19}{res}{space 2} 12.70919{col 31}{space 2}  .897065{col 42}{space 1}   14.17{col 51}{space 3}0.000{col 59}{space 4}  10.9435{col 72}{space 3} 14.47488
{txt}{space 9}d_dist90 {c |}{col 19}{res}{space 2} 46.63893{col 31}{space 2} .9565468{col 42}{space 1}   48.76{col 51}{space 3}0.000{col 59}{space 4} 44.75616{col 72}{space 3} 48.52169
{txt}{space 9}d_dist91 {c |}{col 19}{res}{space 2} 44.60541{col 31}{space 2}  .814909{col 42}{space 1}   54.74{col 51}{space 3}0.000{col 59}{space 4} 43.00143{col 72}{space 3} 46.20939
{txt}{space 9}d_dist92 {c |}{col 19}{res}{space 2}-29.06736{col 31}{space 2} .8099559{col 42}{space 1}  -35.89{col 51}{space 3}0.000{col 59}{space 4}-30.66159{col 72}{space 3}-27.47313
{txt}{space 9}d_dist93 {c |}{col 19}{res}{space 2}-16.60343{col 31}{space 2} .0737752{col 42}{space 1} -225.05{col 51}{space 3}0.000{col 59}{space 4}-16.74864{col 72}{space 3}-16.45822
{txt}{space 9}d_dist94 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 9}d_dist95 {c |}{col 19}{res}{space 2}  4.69248{col 31}{space 2} .5309507{col 42}{space 1}    8.84{col 51}{space 3}0.000{col 59}{space 4} 3.647413{col 72}{space 3} 5.737547
{txt}{space 9}d_dist96 {c |}{col 19}{res}{space 2} 7.579156{col 31}{space 2} .0051313{col 42}{space 1} 1477.05{col 51}{space 3}0.000{col 59}{space 4} 7.569056{col 72}{space 3} 7.589256
{txt}{space 9}d_dist97 {c |}{col 19}{res}{space 2} 3.856443{col 31}{space 2} .0539332{col 42}{space 1}   71.50{col 51}{space 3}0.000{col 59}{space 4} 3.750287{col 72}{space 3}   3.9626
{txt}{space 9}d_dist98 {c |}{col 19}{res}{space 2}-21.66145{col 31}{space 2} .5248261{col 42}{space 1}  -41.27{col 51}{space 3}0.000{col 59}{space 4}-22.69446{col 72}{space 3}-20.62844
{txt}{space 9}d_dist99 {c |}{col 19}{res}{space 2}-16.08404{col 31}{space 2} .7825726{col 42}{space 1}  -20.55{col 51}{space 3}0.000{col 59}{space 4}-17.62438{col 72}{space 3}-14.54371
{txt}{space 8}d_dist100 {c |}{col 19}{res}{space 2}-16.37497{col 31}{space 2}  1.37087{col 42}{space 1}  -11.94{col 51}{space 3}0.000{col 59}{space 4}-19.07324{col 72}{space 3}-13.67669
{txt}{space 8}d_dist101 {c |}{col 19}{res}{space 2} 77.51927{col 31}{space 2} 6.005709{col 42}{space 1}   12.91{col 51}{space 3}0.000{col 59}{space 4} 65.69827{col 72}{space 3} 89.34027
{txt}{space 8}d_dist102 {c |}{col 19}{res}{space 2} 42.13417{col 31}{space 2} 5.181258{col 42}{space 1}    8.13{col 51}{space 3}0.000{col 59}{space 4} 31.93594{col 72}{space 3} 52.33241
{txt}{space 8}d_dist103 {c |}{col 19}{res}{space 2}  29.9394{col 31}{space 2}  4.99668{col 42}{space 1}    5.99{col 51}{space 3}0.000{col 59}{space 4} 20.10447{col 72}{space 3} 39.77433
{txt}{space 8}d_dist104 {c |}{col 19}{res}{space 2} 53.05201{col 31}{space 2} 5.396869{col 42}{space 1}    9.83{col 51}{space 3}0.000{col 59}{space 4} 42.42939{col 72}{space 3} 63.67463
{txt}{space 8}d_dist105 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist106 {c |}{col 19}{res}{space 2}-32.88688{col 31}{space 2} .3462741{col 42}{space 1}  -94.97{col 51}{space 3}0.000{col 59}{space 4}-33.56845{col 72}{space 3}-32.20532
{txt}{space 8}d_dist107 {c |}{col 19}{res}{space 2}-29.70328{col 31}{space 2} .5574742{col 42}{space 1}  -53.28{col 51}{space 3}0.000{col 59}{space 4}-30.80055{col 72}{space 3}  -28.606
{txt}{space 8}d_dist108 {c |}{col 19}{res}{space 2}-46.31823{col 31}{space 2} .4770231{col 42}{space 1}  -97.10{col 51}{space 3}0.000{col 59}{space 4}-47.25716{col 72}{space 3}-45.37931
{txt}{space 8}d_dist109 {c |}{col 19}{res}{space 2} -41.8287{col 31}{space 2} .7209036{col 42}{space 1}  -58.02{col 51}{space 3}0.000{col 59}{space 4}-43.24765{col 72}{space 3}-40.40975
{txt}{space 8}d_dist110 {c |}{col 19}{res}{space 2}  .702702{col 31}{space 2} .2051022{col 42}{space 1}    3.43{col 51}{space 3}0.001{col 59}{space 4} .2990008{col 72}{space 3} 1.106403
{txt}{space 8}d_dist111 {c |}{col 19}{res}{space 2}-46.68107{col 31}{space 2} .4085774{col 42}{space 1} -114.25{col 51}{space 3}0.000{col 59}{space 4}-47.48527{col 72}{space 3}-45.87687
{txt}{space 8}d_dist112 {c |}{col 19}{res}{space 2}-39.23627{col 31}{space 2} .1744734{col 42}{space 1} -224.88{col 51}{space 3}0.000{col 59}{space 4}-39.57968{col 72}{space 3}-38.89285
{txt}{space 8}d_dist113 {c |}{col 19}{res}{space 2}-2.942366{col 31}{space 2} .0957259{col 42}{space 1}  -30.74{col 51}{space 3}0.000{col 59}{space 4}-3.130782{col 72}{space 3}-2.753949
{txt}{space 8}d_dist114 {c |}{col 19}{res}{space 2}-8.173045{col 31}{space 2} .1321516{col 42}{space 1}  -61.85{col 51}{space 3}0.000{col 59}{space 4}-8.433158{col 72}{space 3}-7.912932
{txt}{space 8}d_dist115 {c |}{col 19}{res}{space 2}-.3322401{col 31}{space 2} .5498115{col 42}{space 1}   -0.60{col 51}{space 3}0.546{col 59}{space 4} -1.41443{col 72}{space 3} .7499502
{txt}{space 8}d_dist116 {c |}{col 19}{res}{space 2}-.0442341{col 31}{space 2} .5409094{col 42}{space 1}   -0.08{col 51}{space 3}0.935{col 59}{space 4}-1.108902{col 72}{space 3} 1.020434
{txt}{space 8}d_dist117 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist118 {c |}{col 19}{res}{space 2} 16.11925{col 31}{space 2} .9470091{col 42}{space 1}   17.02{col 51}{space 3}0.000{col 59}{space 4} 14.25526{col 72}{space 3} 17.98324
{txt}{space 8}d_dist119 {c |}{col 19}{res}{space 2} 2.252894{col 31}{space 2} .5584053{col 42}{space 1}    4.03{col 51}{space 3}0.000{col 59}{space 4} 1.153788{col 72}{space 3} 3.351999
{txt}{space 8}d_dist120 {c |}{col 19}{res}{space 2}-18.55295{col 31}{space 2} .2597728{col 42}{space 1}  -71.42{col 51}{space 3}0.000{col 59}{space 4}-19.06426{col 72}{space 3}-18.04164
{txt}{space 8}d_dist121 {c |}{col 19}{res}{space 2}-5.446057{col 31}{space 2}  .620275{col 42}{space 1}   -8.78{col 51}{space 3}0.000{col 59}{space 4} -6.66694{col 72}{space 3}-4.225174
{txt}{space 8}d_dist122 {c |}{col 19}{res}{space 2} 13.55672{col 31}{space 2} 2.077917{col 42}{space 1}    6.52{col 51}{space 3}0.000{col 59}{space 4} 9.466769{col 72}{space 3} 17.64667
{txt}{space 8}d_dist123 {c |}{col 19}{res}{space 2}-33.64618{col 31}{space 2} .5603384{col 42}{space 1}  -60.05{col 51}{space 3}0.000{col 59}{space 4}-34.74909{col 72}{space 3}-32.54327
{txt}{space 8}d_dist124 {c |}{col 19}{res}{space 2}-3.755159{col 31}{space 2} .4293526{col 42}{space 1}   -8.75{col 51}{space 3}0.000{col 59}{space 4}-4.600251{col 72}{space 3}-2.910067
{txt}{space 8}d_dist125 {c |}{col 19}{res}{space 2}  -6.6544{col 31}{space 2} .3294036{col 42}{space 1}  -20.20{col 51}{space 3}0.000{col 59}{space 4}-7.302762{col 72}{space 3}-6.006037
{txt}{space 8}d_dist126 {c |}{col 19}{res}{space 2}-6.339092{col 31}{space 2} .3173487{col 42}{space 1}  -19.98{col 51}{space 3}0.000{col 59}{space 4}-6.963727{col 72}{space 3}-5.714456
{txt}{space 8}d_dist127 {c |}{col 19}{res}{space 2}-37.82452{col 31}{space 2} .2173676{col 42}{space 1} -174.01{col 51}{space 3}0.000{col 59}{space 4}-38.25237{col 72}{space 3}-37.39668
{txt}{space 8}d_dist128 {c |}{col 19}{res}{space 2} -7.36073{col 31}{space 2} .2634382{col 42}{space 1}  -27.94{col 51}{space 3}0.000{col 59}{space 4}-7.879253{col 72}{space 3}-6.842206
{txt}{space 8}d_dist129 {c |}{col 19}{res}{space 2}-17.22371{col 31}{space 2} .3309506{col 42}{space 1}  -52.04{col 51}{space 3}0.000{col 59}{space 4}-17.87512{col 72}{space 3} -16.5723
{txt}{space 8}d_dist130 {c |}{col 19}{res}{space 2}-10.37625{col 31}{space 2} .3116676{col 42}{space 1}  -33.29{col 51}{space 3}0.000{col 59}{space 4}-10.98971{col 72}{space 3}-9.762799
{txt}{space 8}d_dist131 {c |}{col 19}{res}{space 2}-19.80266{col 31}{space 2} .4698308{col 42}{space 1}  -42.15{col 51}{space 3}0.000{col 59}{space 4}-20.72743{col 72}{space 3} -18.8779
{txt}{space 8}d_dist132 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist133 {c |}{col 19}{res}{space 2}-14.43016{col 31}{space 2} .4698308{col 42}{space 1}  -30.71{col 51}{space 3}0.000{col 59}{space 4}-15.35493{col 72}{space 3} -13.5054
{txt}{space 8}d_dist134 {c |}{col 19}{res}{space 2}-41.84516{col 31}{space 2} .4698308{col 42}{space 1}  -89.06{col 51}{space 3}0.000{col 59}{space 4}-42.76993{col 72}{space 3} -40.9204
{txt}{space 8}d_dist135 {c |}{col 19}{res}{space 2}-56.64556{col 31}{space 2} .4418531{col 42}{space 1} -128.20{col 51}{space 3}0.000{col 59}{space 4}-57.51525{col 72}{space 3}-55.77586
{txt}{space 8}d_dist136 {c |}{col 19}{res}{space 2}-58.98516{col 31}{space 2} .4698308{col 42}{space 1} -125.55{col 51}{space 3}0.000{col 59}{space 4}-59.90993{col 72}{space 3} -58.0604
{txt}{space 8}d_dist137 {c |}{col 19}{res}{space 2}-47.37623{col 31}{space 2} .3605378{col 42}{space 1} -131.40{col 51}{space 3}0.000{col 59}{space 4}-48.08588{col 72}{space 3}-46.66659
{txt}{space 8}d_dist138 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist139 {c |}{col 19}{res}{space 2} 5.545569{col 31}{space 2} 4.031317{col 42}{space 1}    1.38{col 51}{space 3}0.170{col 59}{space 4}-2.389245{col 72}{space 3} 13.48038
{txt}{space 8}d_dist140 {c |}{col 19}{res}{space 2}  6.50086{col 31}{space 2} 3.951027{col 42}{space 1}    1.65{col 51}{space 3}0.101{col 59}{space 4}-1.275919{col 72}{space 3} 14.27764
{txt}{space 8}d_dist141 {c |}{col 19}{res}{space 2}-21.98385{col 31}{space 2} 3.926644{col 42}{space 1}   -5.60{col 51}{space 3}0.000{col 59}{space 4}-29.71263{col 72}{space 3}-14.25506
{txt}{space 8}d_dist142 {c |}{col 19}{res}{space 2}-30.90743{col 31}{space 2} 3.953245{col 42}{space 1}   -7.82{col 51}{space 3}0.000{col 59}{space 4}-38.68858{col 72}{space 3}-23.12629
{txt}{space 8}d_dist143 {c |}{col 19}{res}{space 2} .4739563{col 31}{space 2} 4.041975{col 42}{space 1}    0.12{col 51}{space 3}0.907{col 59}{space 4}-7.481836{col 72}{space 3} 8.429749
{txt}{space 8}d_dist144 {c |}{col 19}{res}{space 2}-17.43441{col 31}{space 2} 2.294886{col 42}{space 1}   -7.60{col 51}{space 3}0.000{col 59}{space 4}-21.95142{col 72}{space 3} -12.9174
{txt}{space 8}d_dist145 {c |}{col 19}{res}{space 2}-18.05409{col 31}{space 2} 3.900478{col 42}{space 1}   -4.63{col 51}{space 3}0.000{col 59}{space 4}-25.73138{col 72}{space 3}-10.37681
{txt}{space 8}d_dist146 {c |}{col 19}{res}{space 2}-47.55679{col 31}{space 2} .4340059{col 42}{space 1} -109.58{col 51}{space 3}0.000{col 59}{space 4}-48.41104{col 72}{space 3}-46.70254
{txt}{space 8}d_dist147 {c |}{col 19}{res}{space 2}-.7212994{col 31}{space 2} .5571326{col 42}{space 1}   -1.29{col 51}{space 3}0.196{col 59}{space 4}  -1.8179{col 72}{space 3} .3753011
{txt}{space 8}d_dist148 {c |}{col 19}{res}{space 2}-27.75799{col 31}{space 2} .9497317{col 42}{space 1}  -29.23{col 51}{space 3}0.000{col 59}{space 4}-29.62734{col 72}{space 3}-25.88864
{txt}{space 8}d_dist149 {c |}{col 19}{res}{space 2} -28.7408{col 31}{space 2} .5069389{col 42}{space 1}  -56.69{col 51}{space 3}0.000{col 59}{space 4} -29.7386{col 72}{space 3}-27.74299
{txt}{space 8}d_dist150 {c |}{col 19}{res}{space 2}-25.95598{col 31}{space 2} .4558273{col 42}{space 1}  -56.94{col 51}{space 3}0.000{col 59}{space 4}-26.85318{col 72}{space 3}-25.05878
{txt}{space 8}d_dist151 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist152 {c |}{col 19}{res}{space 2} 3.285997{col 31}{space 2} .5327141{col 42}{space 1}    6.17{col 51}{space 3}0.000{col 59}{space 4}  2.23746{col 72}{space 3} 4.334535
{txt}{space 8}d_dist153 {c |}{col 19}{res}{space 2} 4.869331{col 31}{space 2} .8944339{col 42}{space 1}    5.44{col 51}{space 3}0.000{col 59}{space 4} 3.108822{col 72}{space 3} 6.629839
{txt}{space 8}d_dist154 {c |}{col 19}{res}{space 2}   3.4714{col 31}{space 2} .5896905{col 42}{space 1}    5.89{col 51}{space 3}0.000{col 59}{space 4} 2.310716{col 72}{space 3} 4.632084
{txt}{space 8}d_dist155 {c |}{col 19}{res}{space 2} 6.581359{col 31}{space 2}  5.07849{col 42}{space 1}    1.30{col 51}{space 3}0.196{col 59}{space 4}-3.414598{col 72}{space 3} 16.57732
{txt}{space 8}d_dist156 {c |}{col 19}{res}{space 2} 35.40496{col 31}{space 2} 5.043089{col 42}{space 1}    7.02{col 51}{space 3}0.000{col 59}{space 4} 25.47868{col 72}{space 3} 45.33124
{txt}{space 8}d_dist157 {c |}{col 19}{res}{space 2} 26.57082{col 31}{space 2} 4.651564{col 42}{space 1}    5.71{col 51}{space 3}0.000{col 59}{space 4} 17.41517{col 72}{space 3} 35.72646
{txt}{space 8}d_dist158 {c |}{col 19}{res}{space 2} 31.78315{col 31}{space 2} .7510324{col 42}{space 1}   42.32{col 51}{space 3}0.000{col 59}{space 4}  30.3049{col 72}{space 3} 33.26141
{txt}{space 8}d_dist159 {c |}{col 19}{res}{space 2} 28.44169{col 31}{space 2} .6099497{col 42}{space 1}   46.63{col 51}{space 3}0.000{col 59}{space 4} 27.24113{col 72}{space 3} 29.64225
{txt}{space 8}d_dist160 {c |}{col 19}{res}{space 2} -7.82426{col 31}{space 2} .5716513{col 42}{space 1}  -13.69{col 51}{space 3}0.000{col 59}{space 4}-8.949438{col 72}{space 3}-6.699083
{txt}{space 8}d_dist161 {c |}{col 19}{res}{space 2} 35.09811{col 31}{space 2}  .587395{col 42}{space 1}   59.75{col 51}{space 3}0.000{col 59}{space 4} 33.94194{col 72}{space 3} 36.25428
{txt}{space 8}d_dist162 {c |}{col 19}{res}{space 2} 26.38914{col 31}{space 2} .6631548{col 42}{space 1}   39.79{col 51}{space 3}0.000{col 59}{space 4} 25.08386{col 72}{space 3} 27.69442
{txt}{space 8}d_dist163 {c |}{col 19}{res}{space 2} 38.44551{col 31}{space 2} .5076718{col 42}{space 1}   75.73{col 51}{space 3}0.000{col 59}{space 4} 37.44626{col 72}{space 3} 39.44476
{txt}{space 8}d_dist164 {c |}{col 19}{res}{space 2} 28.79285{col 31}{space 2} .0805986{col 42}{space 1}  357.24{col 51}{space 3}0.000{col 59}{space 4} 28.63421{col 72}{space 3} 28.95149
{txt}{space 8}d_dist165 {c |}{col 19}{res}{space 2} 5.594071{col 31}{space 2}  .769575{col 42}{space 1}    7.27{col 51}{space 3}0.000{col 59}{space 4} 4.079322{col 72}{space 3}  7.10882
{txt}{space 8}d_dist166 {c |}{col 19}{res}{space 2} 24.98048{col 31}{space 2} .0593689{col 42}{space 1}  420.77{col 51}{space 3}0.000{col 59}{space 4} 24.86363{col 72}{space 3} 25.09734
{txt}{space 8}d_dist167 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist168 {c |}{col 19}{res}{space 2} 1.778429{col 31}{space 2} .0205473{col 42}{space 1}   86.55{col 51}{space 3}0.000{col 59}{space 4} 1.737986{col 72}{space 3} 1.818873
{txt}{space 8}d_dist169 {c |}{col 19}{res}{space 2}-26.38625{col 31}{space 2} .4879146{col 42}{space 1}  -54.08{col 51}{space 3}0.000{col 59}{space 4} -27.3466{col 72}{space 3}-25.42589
{txt}{space 8}d_dist170 {c |}{col 19}{res}{space 2}  35.1189{col 31}{space 2} .0444291{col 42}{space 1}  790.45{col 51}{space 3}0.000{col 59}{space 4} 35.03145{col 72}{space 3} 35.20635
{txt}{space 8}d_dist171 {c |}{col 19}{res}{space 2}  9.34874{col 31}{space 2} .4098417{col 42}{space 1}   22.81{col 51}{space 3}0.000{col 59}{space 4} 8.542051{col 72}{space 3} 10.15543
{txt}{space 8}d_dist172 {c |}{col 19}{res}{space 2}-7.216999{col 31}{space 2} .6176682{col 42}{space 1}  -11.68{col 51}{space 3}0.000{col 59}{space 4}-8.432751{col 72}{space 3}-6.001247
{txt}{space 8}d_dist173 {c |}{col 19}{res}{space 2}-11.93615{col 31}{space 2} .9819847{col 42}{space 1}  -12.16{col 51}{space 3}0.000{col 59}{space 4}-13.86899{col 72}{space 3}-10.00332
{txt}{space 8}d_dist174 {c |}{col 19}{res}{space 2}-21.46317{col 31}{space 2} .6522144{col 42}{space 1}  -32.91{col 51}{space 3}0.000{col 59}{space 4}-22.74692{col 72}{space 3}-20.17942
{txt}{space 8}d_dist175 {c |}{col 19}{res}{space 2} 7.366096{col 31}{space 2} .6380917{col 42}{space 1}   11.54{col 51}{space 3}0.000{col 59}{space 4} 6.110145{col 72}{space 3} 8.622048
{txt}{space 8}d_dist176 {c |}{col 19}{res}{space 2}-18.00197{col 31}{space 2} .6021018{col 42}{space 1}  -29.90{col 51}{space 3}0.000{col 59}{space 4}-19.18708{col 72}{space 3}-16.81685
{txt}{space 8}d_dist177 {c |}{col 19}{res}{space 2}-34.03133{col 31}{space 2}  .603511{col 42}{space 1}  -56.39{col 51}{space 3}0.000{col 59}{space 4}-35.21922{col 72}{space 3}-32.84345
{txt}{space 8}d_dist178 {c |}{col 19}{res}{space 2}-53.89496{col 31}{space 2} .5943659{col 42}{space 1}  -90.68{col 51}{space 3}0.000{col 59}{space 4}-55.06484{col 72}{space 3}-52.72507
{txt}{space 8}d_dist179 {c |}{col 19}{res}{space 2}-41.52246{col 31}{space 2} 1.076349{col 42}{space 1}  -38.58{col 51}{space 3}0.000{col 59}{space 4}-43.64104{col 72}{space 3}-39.40389
{txt}{space 8}d_dist180 {c |}{col 19}{res}{space 2}-38.30143{col 31}{space 2} .6989394{col 42}{space 1}  -54.80{col 51}{space 3}0.000{col 59}{space 4}-39.67715{col 72}{space 3}-36.92571
{txt}{space 8}d_dist181 {c |}{col 19}{res}{space 2}-39.97601{col 31}{space 2} .5940642{col 42}{space 1}  -67.29{col 51}{space 3}0.000{col 59}{space 4} -41.1453{col 72}{space 3}-38.80672
{txt}{space 8}d_dist182 {c |}{col 19}{res}{space 2}-51.10297{col 31}{space 2} .7324333{col 42}{space 1}  -69.77{col 51}{space 3}0.000{col 59}{space 4}-52.54462{col 72}{space 3}-49.66133
{txt}{space 8}d_dist183 {c |}{col 19}{res}{space 2}-50.94872{col 31}{space 2} .5927443{col 42}{space 1}  -85.95{col 51}{space 3}0.000{col 59}{space 4}-52.11541{col 72}{space 3}-49.78202
{txt}{space 8}d_dist184 {c |}{col 19}{res}{space 2}-49.34723{col 31}{space 2} .7609712{col 42}{space 1}  -64.85{col 51}{space 3}0.000{col 59}{space 4}-50.84504{col 72}{space 3}-47.84941
{txt}{space 8}d_dist185 {c |}{col 19}{res}{space 2}-7.322222{col 31}{space 2} .8138295{col 42}{space 1}   -9.00{col 51}{space 3}0.000{col 59}{space 4}-8.924077{col 72}{space 3}-5.720367
{txt}{space 8}d_dist186 {c |}{col 19}{res}{space 2} -39.9603{col 31}{space 2} 1.222268{col 42}{space 1}  -32.69{col 51}{space 3}0.000{col 59}{space 4}-42.36608{col 72}{space 3}-37.55452
{txt}{space 8}d_dist187 {c |}{col 19}{res}{space 2} -50.9553{col 31}{space 2} 1.222268{col 42}{space 1}  -41.69{col 51}{space 3}0.000{col 59}{space 4}-53.36108{col 72}{space 3}-48.54952
{txt}{space 8}d_dist188 {c |}{col 19}{res}{space 2} -54.8203{col 31}{space 2} 1.222268{col 42}{space 1}  -44.85{col 51}{space 3}0.000{col 59}{space 4}-57.22608{col 72}{space 3}-52.41452
{txt}{space 8}d_dist189 {c |}{col 19}{res}{space 2}-36.31066{col 31}{space 2} 1.086516{col 42}{space 1}  -33.42{col 51}{space 3}0.000{col 59}{space 4}-38.44924{col 72}{space 3}-34.17207
{txt}{space 8}d_dist190 {c |}{col 19}{res}{space 2}-26.21871{col 31}{space 2} .9577938{col 42}{space 1}  -27.37{col 51}{space 3}0.000{col 59}{space 4}-28.10392{col 72}{space 3}-24.33349
{txt}{space 8}d_dist191 {c |}{col 19}{res}{space 2}-5.814029{col 31}{space 2} .8698131{col 42}{space 1}   -6.68{col 51}{space 3}0.000{col 59}{space 4}-7.526077{col 72}{space 3}-4.101982
{txt}{space 8}d_dist192 {c |}{col 19}{res}{space 2}-2.900649{col 31}{space 2} .8972001{col 42}{space 1}   -3.23{col 51}{space 3}0.001{col 59}{space 4}-4.666602{col 72}{space 3}-1.134696
{txt}{space 8}d_dist193 {c |}{col 19}{res}{space 2} -25.4869{col 31}{space 2} .6543261{col 42}{space 1}  -38.95{col 51}{space 3}0.000{col 59}{space 4}-26.77481{col 72}{space 3}  -24.199
{txt}{space 8}d_dist194 {c |}{col 19}{res}{space 2}-30.20576{col 31}{space 2} 1.033612{col 42}{space 1}  -29.22{col 51}{space 3}0.000{col 59}{space 4}-32.24021{col 72}{space 3}-28.17131
{txt}{space 8}d_dist195 {c |}{col 19}{res}{space 2} 6.632933{col 31}{space 2} 1.615884{col 42}{space 1}    4.10{col 51}{space 3}0.000{col 59}{space 4} 3.452399{col 72}{space 3} 9.813468
{txt}{space 8}d_dist196 {c |}{col 19}{res}{space 2}-5.791036{col 31}{space 2} .8452778{col 42}{space 1}   -6.85{col 51}{space 3}0.000{col 59}{space 4}-7.454791{col 72}{space 3}-4.127282
{txt}{space 8}d_dist197 {c |}{col 19}{res}{space 2} 4.008248{col 31}{space 2} .6002673{col 42}{space 1}    6.68{col 51}{space 3}0.000{col 59}{space 4} 2.826746{col 72}{space 3}  5.18975
{txt}{space 8}d_dist198 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist199 {c |}{col 19}{res}{space 2}-23.31716{col 31}{space 2} .6272339{col 42}{space 1}  -37.17{col 51}{space 3}0.000{col 59}{space 4}-24.55174{col 72}{space 3}-22.08258
{txt}{space 8}d_dist200 {c |}{col 19}{res}{space 2}-28.08234{col 31}{space 2} .8980939{col 42}{space 1}  -31.27{col 51}{space 3}0.000{col 59}{space 4}-29.85005{col 72}{space 3}-26.31463
{txt}{space 8}d_dist201 {c |}{col 19}{res}{space 2} -4.43537{col 31}{space 2} .7034203{col 42}{space 1}   -6.31{col 51}{space 3}0.000{col 59}{space 4}-5.819907{col 72}{space 3}-3.050832
{txt}{space 8}d_dist202 {c |}{col 19}{res}{space 2}-40.32595{col 31}{space 2} .1746064{col 42}{space 1} -230.95{col 51}{space 3}0.000{col 59}{space 4}-40.66963{col 72}{space 3}-39.98228
{txt}{space 8}d_dist203 {c |}{col 19}{res}{space 2}-28.86105{col 31}{space 2} .0409019{col 42}{space 1} -705.62{col 51}{space 3}0.000{col 59}{space 4}-28.94156{col 72}{space 3}-28.78054
{txt}{space 8}d_dist204 {c |}{col 19}{res}{space 2} 3.930606{col 31}{space 2} .7182569{col 42}{space 1}    5.47{col 51}{space 3}0.000{col 59}{space 4} 2.516866{col 72}{space 3} 5.344346
{txt}{space 8}d_dist205 {c |}{col 19}{res}{space 2} -29.6975{col 31}{space 2} 4.21e-08{col 42}{space 1}-7.0e+08{col 51}{space 3}0.000{col 59}{space 4} -29.6975{col 72}{space 3} -29.6975
{txt}{space 8}d_dist206 {c |}{col 19}{res}{space 2}-6.885278{col 31}{space 2} .1665788{col 42}{space 1}  -41.33{col 51}{space 3}0.000{col 59}{space 4}-7.213154{col 72}{space 3}-6.557402
{txt}{space 8}d_dist207 {c |}{col 19}{res}{space 2} 4.255875{col 31}{space 2} .0051447{col 42}{space 1}  827.24{col 51}{space 3}0.000{col 59}{space 4} 4.245748{col 72}{space 3} 4.266001
{txt}{space 8}d_dist208 {c |}{col 19}{res}{space 2}-34.07506{col 31}{space 2} .1679315{col 42}{space 1} -202.91{col 51}{space 3}0.000{col 59}{space 4} -34.4056{col 72}{space 3}-33.74452
{txt}{space 8}d_dist209 {c |}{col 19}{res}{space 2}-18.33616{col 31}{space 2} .0467623{col 42}{space 1} -392.11{col 51}{space 3}0.000{col 59}{space 4}-18.42821{col 72}{space 3}-18.24412
{txt}{space 8}d_dist210 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist211 {c |}{col 19}{res}{space 2} -3.34887{col 31}{space 2} .1341927{col 42}{space 1}  -24.96{col 51}{space 3}0.000{col 59}{space 4}-3.613001{col 72}{space 3} -3.08474
{txt}{space 8}d_dist212 {c |}{col 19}{res}{space 2}-20.48962{col 31}{space 2} .4543827{col 42}{space 1}  -45.09{col 51}{space 3}0.000{col 59}{space 4}-21.38398{col 72}{space 3}-19.59526
{txt}{space 8}d_dist213 {c |}{col 19}{res}{space 2}-34.92072{col 31}{space 2} .0114854{col 42}{space 1}-3040.45{col 51}{space 3}0.000{col 59}{space 4}-34.94333{col 72}{space 3}-34.89812
{txt}{space 8}d_dist214 {c |}{col 19}{res}{space 2}-28.26507{col 31}{space 2} .0094287{col 42}{space 1}-2997.77{col 51}{space 3}0.000{col 59}{space 4}-28.28363{col 72}{space 3}-28.24651
{txt}{space 8}d_dist215 {c |}{col 19}{res}{space 2} 21.94723{col 31}{space 2} .0495529{col 42}{space 1}  442.91{col 51}{space 3}0.000{col 59}{space 4}  21.8497{col 72}{space 3} 22.04477
{txt}{space 8}d_dist216 {c |}{col 19}{res}{space 2} 28.68685{col 31}{space 2} .0387242{col 42}{space 1}  740.80{col 51}{space 3}0.000{col 59}{space 4} 28.61063{col 72}{space 3} 28.76307
{txt}{space 8}d_dist217 {c |}{col 19}{res}{space 2}   33.192{col 31}{space 2} .6609602{col 42}{space 1}   50.22{col 51}{space 3}0.000{col 59}{space 4} 31.89104{col 72}{space 3} 34.49297
{txt}{space 8}d_dist218 {c |}{col 19}{res}{space 2} 35.99095{col 31}{space 2} 1.294109{col 42}{space 1}   27.81{col 51}{space 3}0.000{col 59}{space 4} 33.44377{col 72}{space 3} 38.53814
{txt}{space 8}d_dist219 {c |}{col 19}{res}{space 2} 36.38696{col 31}{space 2} 1.246641{col 42}{space 1}   29.19{col 51}{space 3}0.000{col 59}{space 4} 33.93321{col 72}{space 3} 38.84072
{txt}{space 8}d_dist220 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist221 {c |}{col 19}{res}{space 2} 32.83796{col 31}{space 2} .8021658{col 42}{space 1}   40.94{col 51}{space 3}0.000{col 59}{space 4} 31.25906{col 72}{space 3} 34.41685
{txt}{space 8}d_dist222 {c |}{col 19}{res}{space 2} 38.32312{col 31}{space 2} 1.093217{col 42}{space 1}   35.06{col 51}{space 3}0.000{col 59}{space 4} 36.17135{col 72}{space 3} 40.47489
{txt}{space 8}d_dist223 {c |}{col 19}{res}{space 2}  2.98117{col 31}{space 2} 1.475455{col 42}{space 1}    2.02{col 51}{space 3}0.044{col 59}{space 4} .0770414{col 72}{space 3} 5.885298
{txt}{space 8}d_dist224 {c |}{col 19}{res}{space 2} 9.536705{col 31}{space 2} .9222215{col 42}{space 1}   10.34{col 51}{space 3}0.000{col 59}{space 4} 7.721503{col 72}{space 3} 11.35191
{txt}{space 8}d_dist225 {c |}{col 19}{res}{space 2}-17.02006{col 31}{space 2} 1.019353{col 42}{space 1}  -16.70{col 51}{space 3}0.000{col 59}{space 4}-19.02644{col 72}{space 3}-15.01367
{txt}{space 8}d_dist226 {c |}{col 19}{res}{space 2} 28.77639{col 31}{space 2} .8061577{col 42}{space 1}   35.70{col 51}{space 3}0.000{col 59}{space 4} 27.18964{col 72}{space 3} 30.36315
{txt}{space 8}d_dist227 {c |}{col 19}{res}{space 2} 8.001644{col 31}{space 2} .7293224{col 42}{space 1}   10.97{col 51}{space 3}0.000{col 59}{space 4} 6.566124{col 72}{space 3} 9.437164
{txt}{space 8}d_dist228 {c |}{col 19}{res}{space 2}  33.1351{col 31}{space 2} .9249382{col 42}{space 1}   35.82{col 51}{space 3}0.000{col 59}{space 4} 31.31455{col 72}{space 3} 34.95565
{txt}{space 8}d_dist229 {c |}{col 19}{res}{space 2}  25.0863{col 31}{space 2} 1.046223{col 42}{space 1}   23.98{col 51}{space 3}0.000{col 59}{space 4} 23.02702{col 72}{space 3} 27.14557
{txt}{space 8}d_dist230 {c |}{col 19}{res}{space 2} 26.73451{col 31}{space 2} .7910732{col 42}{space 1}   33.80{col 51}{space 3}0.000{col 59}{space 4} 25.17745{col 72}{space 3} 28.29158
{txt}{space 8}d_dist231 {c |}{col 19}{res}{space 2} -5.43624{col 31}{space 2} .3672695{col 42}{space 1}  -14.80{col 51}{space 3}0.000{col 59}{space 4}-6.159134{col 72}{space 3}-4.713346
{txt}{space 8}d_dist232 {c |}{col 19}{res}{space 2} 19.38028{col 31}{space 2} .1515343{col 42}{space 1}  127.89{col 51}{space 3}0.000{col 59}{space 4} 19.08202{col 72}{space 3} 19.67855
{txt}{space 8}d_dist233 {c |}{col 19}{res}{space 2} 41.50976{col 31}{space 2} .6303292{col 42}{space 1}   65.85{col 51}{space 3}0.000{col 59}{space 4} 40.26909{col 72}{space 3} 42.75043
{txt}{space 8}d_dist234 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist235 {c |}{col 19}{res}{space 2} 53.70772{col 31}{space 2} 2.534809{col 42}{space 1}   21.19{col 51}{space 3}0.000{col 59}{space 4} 48.71847{col 72}{space 3} 58.69697
{txt}{space 8}d_dist236 {c |}{col 19}{res}{space 2} 52.42066{col 31}{space 2} .9463454{col 42}{space 1}   55.39{col 51}{space 3}0.000{col 59}{space 4} 50.55797{col 72}{space 3} 54.28334
{txt}{space 8}d_dist237 {c |}{col 19}{res}{space 2}  31.8895{col 31}{space 2} .4433208{col 42}{space 1}   71.93{col 51}{space 3}0.000{col 59}{space 4} 31.01691{col 72}{space 3} 32.76209
{txt}{space 8}d_dist238 {c |}{col 19}{res}{space 2}-48.75833{col 31}{space 2} 4.117287{col 42}{space 1}  -11.84{col 51}{space 3}0.000{col 59}{space 4}-56.86236{col 72}{space 3} -40.6543
{txt}{space 8}d_dist239 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist240 {c |}{col 19}{res}{space 2}-53.27368{col 31}{space 2} 4.221835{col 42}{space 1}  -12.62{col 51}{space 3}0.000{col 59}{space 4}-61.58349{col 72}{space 3}-44.96387
{txt}{space 8}d_dist241 {c |}{col 19}{res}{space 2}-48.17945{col 31}{space 2} 4.125513{col 42}{space 1}  -11.68{col 51}{space 3}0.000{col 59}{space 4}-56.29967{col 72}{space 3}-40.05924
{txt}{space 8}d_dist242 {c |}{col 19}{res}{space 2}-32.95857{col 31}{space 2} 4.215294{col 42}{space 1}   -7.82{col 51}{space 3}0.000{col 59}{space 4} -41.2555{col 72}{space 3}-24.66164
{txt}{space 8}d_dist243 {c |}{col 19}{res}{space 2}-4.623295{col 31}{space 2}   .23737{col 42}{space 1}  -19.48{col 51}{space 3}0.000{col 59}{space 4}-5.090509{col 72}{space 3}-4.156082
{txt}{space 8}d_dist244 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist245 {c |}{col 19}{res}{space 2} 45.66444{col 31}{space 2} .6171639{col 42}{space 1}   73.99{col 51}{space 3}0.000{col 59}{space 4} 44.44968{col 72}{space 3}  46.8792
{txt}{space 8}d_dist246 {c |}{col 19}{res}{space 2} 40.78365{col 31}{space 2} .1389331{col 42}{space 1}  293.55{col 51}{space 3}0.000{col 59}{space 4} 40.51019{col 72}{space 3} 41.05711
{txt}{space 8}d_dist247 {c |}{col 19}{res}{space 2} 62.48228{col 31}{space 2}  .454705{col 42}{space 1}  137.41{col 51}{space 3}0.000{col 59}{space 4} 61.58729{col 72}{space 3} 63.37728
{txt}{space 8}d_dist248 {c |}{col 19}{res}{space 2} 42.91715{col 31}{space 2} .4694156{col 42}{space 1}   91.43{col 51}{space 3}0.000{col 59}{space 4} 41.99321{col 72}{space 3}  43.8411
{txt}{space 8}d_dist249 {c |}{col 19}{res}{space 2} 39.66412{col 31}{space 2} .3496984{col 42}{space 1}  113.42{col 51}{space 3}0.000{col 59}{space 4} 38.97581{col 72}{space 3} 40.35243
{txt}{space 8}d_dist250 {c |}{col 19}{res}{space 2} 40.25883{col 31}{space 2}  .305794{col 42}{space 1}  131.65{col 51}{space 3}0.000{col 59}{space 4} 39.65693{col 72}{space 3} 40.86072
{txt}{space 8}d_dist251 {c |}{col 19}{res}{space 2} 57.76602{col 31}{space 2} .6335462{col 42}{space 1}   91.18{col 51}{space 3}0.000{col 59}{space 4} 56.51902{col 72}{space 3} 59.01303
{txt}{space 8}d_dist252 {c |}{col 19}{res}{space 2} 51.83298{col 31}{space 2} .3924665{col 42}{space 1}  132.07{col 51}{space 3}0.000{col 59}{space 4} 51.06049{col 72}{space 3} 52.60547
{txt}{space 8}d_dist253 {c |}{col 19}{res}{space 2} 22.75859{col 31}{space 2}  .378681{col 42}{space 1}   60.10{col 51}{space 3}0.000{col 59}{space 4} 22.01323{col 72}{space 3} 23.50394
{txt}{space 8}d_dist254 {c |}{col 19}{res}{space 2} 23.06699{col 31}{space 2} .4482083{col 42}{space 1}   51.46{col 51}{space 3}0.000{col 59}{space 4} 22.18478{col 72}{space 3}  23.9492
{txt}{space 8}d_dist255 {c |}{col 19}{res}{space 2} 28.66768{col 31}{space 2} .2697696{col 42}{space 1}  106.27{col 51}{space 3}0.000{col 59}{space 4}  28.1367{col 72}{space 3} 29.19867
{txt}{space 8}d_dist256 {c |}{col 19}{res}{space 2} -2.98507{col 31}{space 2} .2566381{col 42}{space 1}  -11.63{col 51}{space 3}0.000{col 59}{space 4}-3.490209{col 72}{space 3}-2.479932
{txt}{space 8}d_dist257 {c |}{col 19}{res}{space 2} 47.84887{col 31}{space 2} .3708723{col 42}{space 1}  129.02{col 51}{space 3}0.000{col 59}{space 4} 47.11889{col 72}{space 3} 48.57886
{txt}{space 8}d_dist258 {c |}{col 19}{res}{space 2} 53.09072{col 31}{space 2} .8933687{col 42}{space 1}   59.43{col 51}{space 3}0.000{col 59}{space 4} 51.33231{col 72}{space 3} 54.84913
{txt}{space 8}d_dist259 {c |}{col 19}{res}{space 2} 29.46828{col 31}{space 2} .5136461{col 42}{space 1}   57.37{col 51}{space 3}0.000{col 59}{space 4} 28.45727{col 72}{space 3} 30.47928
{txt}{space 8}d_dist260 {c |}{col 19}{res}{space 2} 52.70421{col 31}{space 2} .2350085{col 42}{space 1}  224.27{col 51}{space 3}0.000{col 59}{space 4} 52.24165{col 72}{space 3} 53.16678
{txt}{space 8}d_dist261 {c |}{col 19}{res}{space 2} 67.78889{col 31}{space 2} .7718557{col 42}{space 1}   87.83{col 51}{space 3}0.000{col 59}{space 4} 66.26965{col 72}{space 3} 69.30813
{txt}{space 8}d_dist262 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist263 {c |}{col 19}{res}{space 2} 6.501111{col 31}{space 2} .0503362{col 42}{space 1}  129.15{col 51}{space 3}0.000{col 59}{space 4} 6.402034{col 72}{space 3} 6.600187
{txt}{space 8}d_dist264 {c |}{col 19}{res}{space 2}-5.969296{col 31}{space 2} .1164345{col 42}{space 1}  -51.27{col 51}{space 3}0.000{col 59}{space 4}-6.198474{col 72}{space 3}-5.740119
{txt}{space 8}d_dist265 {c |}{col 19}{res}{space 2}-29.62189{col 31}{space 2} .0458442{col 42}{space 1} -646.14{col 51}{space 3}0.000{col 59}{space 4}-29.71213{col 72}{space 3}-29.53166
{txt}{space 8}d_dist266 {c |}{col 19}{res}{space 2}-40.24362{col 31}{space 2} .0679503{col 42}{space 1} -592.25{col 51}{space 3}0.000{col 59}{space 4}-40.37736{col 72}{space 3}-40.10987
{txt}{space 8}d_dist267 {c |}{col 19}{res}{space 2} -39.8328{col 31}{space 2} .0462719{col 42}{space 1} -860.84{col 51}{space 3}0.000{col 59}{space 4}-39.92388{col 72}{space 3}-39.74172
{txt}{space 8}d_dist268 {c |}{col 19}{res}{space 2}  3.81638{col 31}{space 2} .0679503{col 42}{space 1}   56.16{col 51}{space 3}0.000{col 59}{space 4} 3.682634{col 72}{space 3} 3.950127
{txt}{space 8}d_dist269 {c |}{col 19}{res}{space 2}-45.54266{col 31}{space 2} .0237305{col 42}{space 1}-1919.16{col 51}{space 3}0.000{col 59}{space 4}-45.58936{col 72}{space 3}-45.49595
{txt}{space 8}d_dist270 {c |}{col 19}{res}{space 2}-57.15738{col 31}{space 2} .0236004{col 42}{space 1}-2421.88{col 51}{space 3}0.000{col 59}{space 4}-57.20383{col 72}{space 3}-57.11093
{txt}{space 8}d_dist271 {c |}{col 19}{res}{space 2}-32.66341{col 31}{space 2} 2.190402{col 42}{space 1}  -14.91{col 51}{space 3}0.000{col 59}{space 4}-36.97476{col 72}{space 3}-28.35205
{txt}{space 8}d_dist272 {c |}{col 19}{res}{space 2}-27.97108{col 31}{space 2} 2.167213{col 42}{space 1}  -12.91{col 51}{space 3}0.000{col 59}{space 4}-32.23679{col 72}{space 3}-23.70537
{txt}{space 8}d_dist273 {c |}{col 19}{res}{space 2}-26.20015{col 31}{space 2}  2.16426{col 42}{space 1}  -12.11{col 51}{space 3}0.000{col 59}{space 4}-30.46004{col 72}{space 3}-21.94025
{txt}{space 8}d_dist274 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist275 {c |}{col 19}{res}{space 2}-3.321573{col 31}{space 2} .4902794{col 42}{space 1}   -6.77{col 51}{space 3}0.000{col 59}{space 4}-4.286587{col 72}{space 3}-2.356559
{txt}{space 8}d_dist276 {c |}{col 19}{res}{space 2}-33.55671{col 31}{space 2} 2.154351{col 42}{space 1}  -15.58{col 51}{space 3}0.000{col 59}{space 4}-37.79711{col 72}{space 3}-29.31632
{txt}{space 8}d_dist277 {c |}{col 19}{res}{space 2}-54.68441{col 31}{space 2} 2.153993{col 42}{space 1}  -25.39{col 51}{space 3}0.000{col 59}{space 4} -58.9241{col 72}{space 3}-50.44472
{txt}{space 8}d_dist278 {c |}{col 19}{res}{space 2}-14.42321{col 31}{space 2} 2.213431{col 42}{space 1}   -6.52{col 51}{space 3}0.000{col 59}{space 4}-18.77989{col 72}{space 3}-10.06653
{txt}{space 8}d_dist279 {c |}{col 19}{res}{space 2}-31.27825{col 31}{space 2} 2.195042{col 42}{space 1}  -14.25{col 51}{space 3}0.000{col 59}{space 4}-35.59874{col 72}{space 3}-26.95777
{txt}{space 8}d_dist280 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist281 {c |}{col 19}{res}{space 2}-30.54585{col 31}{space 2} .1270449{col 42}{space 1} -240.43{col 51}{space 3}0.000{col 59}{space 4}-30.79592{col 72}{space 3}-30.29579
{txt}{space 8}d_dist282 {c |}{col 19}{res}{space 2}  -26.638{col 31}{space 2}  .678828{col 42}{space 1}  -39.24{col 51}{space 3}0.000{col 59}{space 4}-27.97414{col 72}{space 3}-25.30187
{txt}{space 8}d_dist283 {c |}{col 19}{res}{space 2}-44.76974{col 31}{space 2} .3145069{col 42}{space 1} -142.35{col 51}{space 3}0.000{col 59}{space 4}-45.38878{col 72}{space 3} -44.1507
{txt}{space 8}d_dist284 {c |}{col 19}{res}{space 2} 9.651882{col 31}{space 2} .0547019{col 42}{space 1}  176.44{col 51}{space 3}0.000{col 59}{space 4} 9.544213{col 72}{space 3} 9.759552
{txt}{space 8}d_dist285 {c |}{col 19}{res}{space 2} 10.16719{col 31}{space 2} .7976864{col 42}{space 1}   12.75{col 51}{space 3}0.000{col 59}{space 4} 8.597113{col 72}{space 3} 11.73727
{txt}{space 8}d_dist286 {c |}{col 19}{res}{space 2}-35.60342{col 31}{space 2} .9277637{col 42}{space 1}  -38.38{col 51}{space 3}0.000{col 59}{space 4}-37.42953{col 72}{space 3}-33.77731
{txt}{space 8}d_dist287 {c |}{col 19}{res}{space 2} -12.5374{col 31}{space 2} .9387691{col 42}{space 1}  -13.36{col 51}{space 3}0.000{col 59}{space 4}-14.38517{col 72}{space 3}-10.68962
{txt}{space 12}inter {c |}{col 19}{res}{space 2}-.7873975{col 31}{space 2} .3725391{col 42}{space 1}   -2.11{col 51}{space 3}0.035{col 59}{space 4}-1.520664{col 72}{space 3}-.0541314
{txt}cum_count_turbine {c |}{col 19}{res}{space 2}-.0066504{col 31}{space 2} .0055473{col 42}{space 1}   -1.20{col 51}{space 3}0.232{col 59}{space 4} -.017569{col 72}{space 3} .0042683
{txt}{space 12}_cons {c |}{col 19}{res}{space 2} 30.62095{col 31}{space 2} 3.957522{col 42}{space 1}    7.74{col 51}{space 3}0.000{col 59}{space 4} 22.83139{col 72}{space 3} 38.41052
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{res}{txt}note: d_sy16 omitted because of collinearity
note: d_sy18 omitted because of collinearity
note: d_sy32 omitted because of collinearity
note: d_sy60 omitted because of collinearity
note: d_dist8 omitted because of collinearity
note: d_dist12 omitted because of collinearity
note: d_dist68 omitted because of collinearity
note: d_dist83 omitted because of collinearity
note: d_dist94 omitted because of collinearity
note: d_dist101 omitted because of collinearity
note: d_dist105 omitted because of collinearity
note: d_dist122 omitted because of collinearity
note: d_dist129 omitted because of collinearity
note: d_dist142 omitted because of collinearity
note: d_dist152 omitted because of collinearity
note: d_dist156 omitted because of collinearity
note: d_dist166 omitted because of collinearity
note: d_dist201 omitted because of collinearity
note: d_dist211 omitted because of collinearity
note: d_dist229 omitted because of collinearity
note: d_dist234 omitted because of collinearity
note: d_dist239 omitted because of collinearity
note: d_dist247 omitted because of collinearity
note: d_dist262 omitted because of collinearity
note: d_dist275 omitted because of collinearity
note: d_dist287 omitted because of collinearity

Linear regression                               Number of obs     = {res}     1,046
                                                {txt}{help j_robustsingular:F(67, 286) }       =  {res}        .
                                                {txt}Prob > F          = {res}         .
                                                {txt}R-squared         = {res}    0.7384
                                                {txt}Root MSE          =    {res} 8.8362

{txt}{ralign 86:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}incumbvotesmajorpe~t{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 15}d_sy1 {c |}{col 22}{res}{space 2}-33.44083{col 34}{space 2} 8.600066{col 45}{space 1}   -3.89{col 54}{space 3}0.000{col 62}{space 4}-50.36828{col 75}{space 3}-16.51338
{txt}{space 15}d_sy2 {c |}{col 22}{res}{space 2}-42.42967{col 34}{space 2} 7.598644{col 45}{space 1}   -5.58{col 54}{space 3}0.000{col 62}{space 4}-57.38603{col 75}{space 3}-27.47331
{txt}{space 15}d_sy3 {c |}{col 22}{res}{space 2}-47.39541{col 34}{space 2} 6.186298{col 45}{space 1}   -7.66{col 54}{space 3}0.000{col 62}{space 4}-59.57186{col 75}{space 3}-35.21897
{txt}{space 15}d_sy4 {c |}{col 22}{res}{space 2} -50.3808{col 34}{space 2} 4.425841{col 45}{space 1}  -11.38{col 54}{space 3}0.000{col 62}{space 4}-59.09216{col 75}{space 3}-41.66945
{txt}{space 15}d_sy5 {c |}{col 22}{res}{space 2}-40.44607{col 34}{space 2} 7.516334{col 45}{space 1}   -5.38{col 54}{space 3}0.000{col 62}{space 4}-55.24042{col 75}{space 3}-25.65172
{txt}{space 15}d_sy6 {c |}{col 22}{res}{space 2}-40.47329{col 34}{space 2} 6.588977{col 45}{space 1}   -6.14{col 54}{space 3}0.000{col 62}{space 4}-53.44233{col 75}{space 3}-27.50426
{txt}{space 15}d_sy7 {c |}{col 22}{res}{space 2}-40.74407{col 34}{space 2}  5.73114{col 45}{space 1}   -7.11{col 54}{space 3}0.000{col 62}{space 4}-52.02463{col 75}{space 3} -29.4635
{txt}{space 15}d_sy8 {c |}{col 22}{res}{space 2}-47.83689{col 34}{space 2} 4.069741{col 45}{space 1}  -11.75{col 54}{space 3}0.000{col 62}{space 4}-55.84733{col 75}{space 3}-39.82644
{txt}{space 15}d_sy9 {c |}{col 22}{res}{space 2}-38.20306{col 34}{space 2} 7.748041{col 45}{space 1}   -4.93{col 54}{space 3}0.000{col 62}{space 4}-53.45348{col 75}{space 3}-22.95264
{txt}{space 14}d_sy10 {c |}{col 22}{res}{space 2}-33.37077{col 34}{space 2} 8.225327{col 45}{space 1}   -4.06{col 54}{space 3}0.000{col 62}{space 4}-49.56062{col 75}{space 3}-17.18091
{txt}{space 14}d_sy11 {c |}{col 22}{res}{space 2} -42.4453{col 34}{space 2} 4.891061{col 45}{space 1}   -8.68{col 54}{space 3}0.000{col 62}{space 4}-52.07234{col 75}{space 3}-32.81826
{txt}{space 14}d_sy12 {c |}{col 22}{res}{space 2}-45.76737{col 34}{space 2} 3.125329{col 45}{space 1}  -14.64{col 54}{space 3}0.000{col 62}{space 4}-51.91894{col 75}{space 3}-39.61581
{txt}{space 14}d_sy13 {c |}{col 22}{res}{space 2}-8.093709{col 34}{space 2} 4.394885{col 45}{space 1}   -1.84{col 54}{space 3}0.067{col 62}{space 4}-16.74413{col 75}{space 3} .5567147
{txt}{space 14}d_sy14 {c |}{col 22}{res}{space 2}-3.710417{col 34}{space 2} 3.063024{col 45}{space 1}   -1.21{col 54}{space 3}0.227{col 62}{space 4}-9.739347{col 75}{space 3} 2.318513
{txt}{space 14}d_sy15 {c |}{col 22}{res}{space 2} 5.940413{col 34}{space 2} 1.485518{col 45}{space 1}    4.00{col 54}{space 3}0.000{col 62}{space 4} 3.016478{col 75}{space 3} 8.864348
{txt}{space 14}d_sy16 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 14}d_sy17 {c |}{col 22}{res}{space 2} 15.54263{col 34}{space 2} 7.236131{col 45}{space 1}    2.15{col 54}{space 3}0.033{col 62}{space 4} 1.299803{col 75}{space 3} 29.78546
{txt}{space 14}d_sy18 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 14}d_sy19 {c |}{col 22}{res}{space 2} 3.572866{col 34}{space 2} 2.365538{col 45}{space 1}    1.51{col 54}{space 3}0.132{col 62}{space 4}-1.083206{col 75}{space 3} 8.228938
{txt}{space 14}d_sy20 {c |}{col 22}{res}{space 2} 1.855829{col 34}{space 2} 6.026552{col 45}{space 1}    0.31{col 54}{space 3}0.758{col 62}{space 4}-10.00619{col 75}{space 3} 13.71785
{txt}{space 14}d_sy21 {c |}{col 22}{res}{space 2}-44.24517{col 34}{space 2} 7.628596{col 45}{space 1}   -5.80{col 54}{space 3}0.000{col 62}{space 4}-59.26048{col 75}{space 3}-29.22985
{txt}{space 14}d_sy22 {c |}{col 22}{res}{space 2}-46.16855{col 34}{space 2} 6.058068{col 45}{space 1}   -7.62{col 54}{space 3}0.000{col 62}{space 4} -58.0926{col 75}{space 3} -34.2445
{txt}{space 14}d_sy23 {c |}{col 22}{res}{space 2} -46.1933{col 34}{space 2} 5.200937{col 45}{space 1}   -8.88{col 54}{space 3}0.000{col 62}{space 4}-56.43027{col 75}{space 3}-35.95633
{txt}{space 14}d_sy24 {c |}{col 22}{res}{space 2}-52.87794{col 34}{space 2} 2.804342{col 45}{space 1}  -18.86{col 54}{space 3}0.000{col 62}{space 4} -58.3977{col 75}{space 3}-47.35817
{txt}{space 14}d_sy25 {c |}{col 22}{res}{space 2}-36.50221{col 34}{space 2} 7.516824{col 45}{space 1}   -4.86{col 54}{space 3}0.000{col 62}{space 4}-51.29752{col 75}{space 3} -21.7069
{txt}{space 14}d_sy26 {c |}{col 22}{res}{space 2}-44.77968{col 34}{space 2} 5.810781{col 45}{space 1}   -7.71{col 54}{space 3}0.000{col 62}{space 4}  -56.217{col 75}{space 3}-33.34236
{txt}{space 14}d_sy27 {c |}{col 22}{res}{space 2}-37.48495{col 34}{space 2}  4.54656{col 45}{space 1}   -8.24{col 54}{space 3}0.000{col 62}{space 4}-46.43392{col 75}{space 3}-28.53599
{txt}{space 14}d_sy28 {c |}{col 22}{res}{space 2}-44.48635{col 34}{space 2} 3.325065{col 45}{space 1}  -13.38{col 54}{space 3}0.000{col 62}{space 4}-51.03105{col 75}{space 3}-37.94164
{txt}{space 14}d_sy29 {c |}{col 22}{res}{space 2}-6.194862{col 34}{space 2} 7.760905{col 45}{space 1}   -0.80{col 54}{space 3}0.425{col 62}{space 4} -21.4706{col 75}{space 3} 9.080875
{txt}{space 14}d_sy30 {c |}{col 22}{res}{space 2}-13.56309{col 34}{space 2} 5.483208{col 45}{space 1}   -2.47{col 54}{space 3}0.014{col 62}{space 4}-24.35565{col 75}{space 3}-2.770529
{txt}{space 14}d_sy31 {c |}{col 22}{res}{space 2}-15.19499{col 34}{space 2} 2.132259{col 45}{space 1}   -7.13{col 54}{space 3}0.000{col 62}{space 4} -19.3919{col 75}{space 3}-10.99808
{txt}{space 14}d_sy32 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 14}d_sy33 {c |}{col 22}{res}{space 2}-36.55354{col 34}{space 2} 7.585036{col 45}{space 1}   -4.82{col 54}{space 3}0.000{col 62}{space 4}-51.48311{col 75}{space 3}-21.62397
{txt}{space 14}d_sy34 {c |}{col 22}{res}{space 2}-30.85133{col 34}{space 2} 7.207654{col 45}{space 1}   -4.28{col 54}{space 3}0.000{col 62}{space 4}-45.03811{col 75}{space 3}-16.66456
{txt}{space 14}d_sy35 {c |}{col 22}{res}{space 2}-37.22266{col 34}{space 2} 5.010872{col 45}{space 1}   -7.43{col 54}{space 3}0.000{col 62}{space 4}-47.08552{col 75}{space 3}-27.35979
{txt}{space 14}d_sy36 {c |}{col 22}{res}{space 2}-44.66544{col 34}{space 2} 4.676854{col 45}{space 1}   -9.55{col 54}{space 3}0.000{col 62}{space 4}-53.87086{col 75}{space 3}-35.46002
{txt}{space 14}d_sy37 {c |}{col 22}{res}{space 2}-24.80163{col 34}{space 2} 7.835198{col 45}{space 1}   -3.17{col 54}{space 3}0.002{col 62}{space 4} -40.2236{col 75}{space 3}-9.379665
{txt}{space 14}d_sy38 {c |}{col 22}{res}{space 2}-19.38012{col 34}{space 2} 5.592504{col 45}{space 1}   -3.47{col 54}{space 3}0.001{col 62}{space 4}-30.38781{col 75}{space 3} -8.37243
{txt}{space 14}d_sy39 {c |}{col 22}{res}{space 2}-23.02953{col 34}{space 2} 5.990095{col 45}{space 1}   -3.84{col 54}{space 3}0.000{col 62}{space 4}-34.81979{col 75}{space 3}-11.23926
{txt}{space 14}d_sy40 {c |}{col 22}{res}{space 2}-49.13025{col 34}{space 2} 5.440296{col 45}{space 1}   -9.03{col 54}{space 3}0.000{col 62}{space 4}-59.83835{col 75}{space 3}-38.42216
{txt}{space 14}d_sy41 {c |}{col 22}{res}{space 2}-47.84272{col 34}{space 2} 7.670086{col 45}{space 1}   -6.24{col 54}{space 3}0.000{col 62}{space 4} -62.9397{col 75}{space 3}-32.74574
{txt}{space 14}d_sy42 {c |}{col 22}{res}{space 2}-47.28745{col 34}{space 2}   6.9116{col 45}{space 1}   -6.84{col 54}{space 3}0.000{col 62}{space 4}-60.89151{col 75}{space 3} -33.6834
{txt}{space 14}d_sy43 {c |}{col 22}{res}{space 2}-52.08874{col 34}{space 2} 4.440192{col 45}{space 1}  -11.73{col 54}{space 3}0.000{col 62}{space 4}-60.82834{col 75}{space 3}-43.34914
{txt}{space 14}d_sy44 {c |}{col 22}{res}{space 2}-55.53354{col 34}{space 2} 3.034234{col 45}{space 1}  -18.30{col 54}{space 3}0.000{col 62}{space 4} -61.5058{col 75}{space 3}-49.56127
{txt}{space 14}d_sy45 {c |}{col 22}{res}{space 2}-22.58266{col 34}{space 2} 8.990933{col 45}{space 1}   -2.51{col 54}{space 3}0.013{col 62}{space 4}-40.27946{col 75}{space 3}-4.885868
{txt}{space 14}d_sy46 {c |}{col 22}{res}{space 2}-24.86741{col 34}{space 2} 7.602787{col 45}{space 1}   -3.27{col 54}{space 3}0.001{col 62}{space 4}-39.83192{col 75}{space 3}-9.902896
{txt}{space 14}d_sy47 {c |}{col 22}{res}{space 2}-23.35912{col 34}{space 2}  4.97418{col 45}{space 1}   -4.70{col 54}{space 3}0.000{col 62}{space 4}-33.14977{col 75}{space 3}-13.56848
{txt}{space 14}d_sy48 {c |}{col 22}{res}{space 2}-30.63695{col 34}{space 2} 3.349562{col 45}{space 1}   -9.15{col 54}{space 3}0.000{col 62}{space 4}-37.22987{col 75}{space 3}-24.04403
{txt}{space 14}d_sy49 {c |}{col 22}{res}{space 2}-29.98499{col 34}{space 2} 7.803009{col 45}{space 1}   -3.84{col 54}{space 3}0.000{col 62}{space 4} -45.3436{col 75}{space 3}-14.62638
{txt}{space 14}d_sy50 {c |}{col 22}{res}{space 2}-30.66632{col 34}{space 2} 6.352697{col 45}{space 1}   -4.83{col 54}{space 3}0.000{col 62}{space 4}-43.17029{col 75}{space 3}-18.16235
{txt}{space 14}d_sy51 {c |}{col 22}{res}{space 2}-27.29224{col 34}{space 2} 5.526255{col 45}{space 1}   -4.94{col 54}{space 3}0.000{col 62}{space 4}-38.16953{col 75}{space 3}-16.41495
{txt}{space 14}d_sy52 {c |}{col 22}{res}{space 2}-33.00338{col 34}{space 2} 7.405989{col 45}{space 1}   -4.46{col 54}{space 3}0.000{col 62}{space 4}-47.58054{col 75}{space 3}-18.42622
{txt}{space 14}d_sy53 {c |}{col 22}{res}{space 2} -29.7804{col 34}{space 2} 8.037956{col 45}{space 1}   -3.70{col 54}{space 3}0.000{col 62}{space 4}-45.60145{col 75}{space 3}-13.95934
{txt}{space 14}d_sy54 {c |}{col 22}{res}{space 2}-35.39883{col 34}{space 2}   6.4156{col 45}{space 1}   -5.52{col 54}{space 3}0.000{col 62}{space 4}-48.02661{col 75}{space 3}-22.77104
{txt}{space 14}d_sy55 {c |}{col 22}{res}{space 2}-39.58997{col 34}{space 2} 6.070442{col 45}{space 1}   -6.52{col 54}{space 3}0.000{col 62}{space 4}-51.53838{col 75}{space 3}-27.64156
{txt}{space 14}d_sy56 {c |}{col 22}{res}{space 2}-38.61809{col 34}{space 2} 4.012111{col 45}{space 1}   -9.63{col 54}{space 3}0.000{col 62}{space 4}-46.51511{col 75}{space 3}-30.72108
{txt}{space 14}d_sy57 {c |}{col 22}{res}{space 2} 20.83747{col 34}{space 2} 3.946857{col 45}{space 1}    5.28{col 54}{space 3}0.000{col 62}{space 4}  13.0689{col 75}{space 3} 28.60604
{txt}{space 14}d_sy58 {c |}{col 22}{res}{space 2}  5.49256{col 34}{space 2}   2.6284{col 45}{space 1}    2.09{col 54}{space 3}0.038{col 62}{space 4} .3190977{col 75}{space 3} 10.66602
{txt}{space 14}d_sy59 {c |}{col 22}{res}{space 2}  12.3598{col 34}{space 2} 2.406688{col 45}{space 1}    5.14{col 54}{space 3}0.000{col 62}{space 4} 7.622737{col 75}{space 3} 17.09687
{txt}{space 14}d_sy60 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 14}d_sy61 {c |}{col 22}{res}{space 2}-41.19447{col 34}{space 2} 7.951499{col 45}{space 1}   -5.18{col 54}{space 3}0.000{col 62}{space 4}-56.84535{col 75}{space 3}-25.54359
{txt}{space 14}d_sy62 {c |}{col 22}{res}{space 2}-41.11233{col 34}{space 2} 7.040392{col 45}{space 1}   -5.84{col 54}{space 3}0.000{col 62}{space 4}-54.96989{col 75}{space 3}-27.25478
{txt}{space 14}d_sy63 {c |}{col 22}{res}{space 2}-44.67418{col 34}{space 2} 5.636377{col 45}{space 1}   -7.93{col 54}{space 3}0.000{col 62}{space 4}-55.76822{col 75}{space 3}-33.58014
{txt}{space 14}d_sy64 {c |}{col 22}{res}{space 2}-48.53364{col 34}{space 2} 4.783134{col 45}{space 1}  -10.15{col 54}{space 3}0.000{col 62}{space 4}-57.94825{col 75}{space 3}-39.11903
{txt}{space 14}d_sy65 {c |}{col 22}{res}{space 2}-48.06283{col 34}{space 2} 7.987753{col 45}{space 1}   -6.02{col 54}{space 3}0.000{col 62}{space 4}-63.78507{col 75}{space 3}-32.34059
{txt}{space 14}d_sy66 {c |}{col 22}{res}{space 2}-48.47159{col 34}{space 2} 6.440023{col 45}{space 1}   -7.53{col 54}{space 3}0.000{col 62}{space 4}-61.14744{col 75}{space 3}-35.79574
{txt}{space 14}d_sy67 {c |}{col 22}{res}{space 2}-51.22432{col 34}{space 2} 4.936757{col 45}{space 1}  -10.38{col 54}{space 3}0.000{col 62}{space 4}-60.94131{col 75}{space 3}-41.50734
{txt}{space 14}d_sy68 {c |}{col 22}{res}{space 2}-60.52579{col 34}{space 2} 4.279629{col 45}{space 1}  -14.14{col 54}{space 3}0.000{col 62}{space 4}-68.94936{col 75}{space 3}-52.10223
{txt}{space 14}d_sy69 {c |}{col 22}{res}{space 2}-34.29809{col 34}{space 2} 7.841066{col 45}{space 1}   -4.37{col 54}{space 3}0.000{col 62}{space 4}-49.73161{col 75}{space 3}-18.86458
{txt}{space 14}d_sy70 {c |}{col 22}{res}{space 2}-33.69405{col 34}{space 2} 7.066236{col 45}{space 1}   -4.77{col 54}{space 3}0.000{col 62}{space 4}-47.60247{col 75}{space 3}-19.78562
{txt}{space 14}d_sy71 {c |}{col 22}{res}{space 2}-36.56608{col 34}{space 2} 5.974697{col 45}{space 1}   -6.12{col 54}{space 3}0.000{col 62}{space 4}-48.32603{col 75}{space 3}-24.80612
{txt}{space 14}d_sy72 {c |}{col 22}{res}{space 2}-39.12193{col 34}{space 2} 5.438117{col 45}{space 1}   -7.19{col 54}{space 3}0.000{col 62}{space 4}-49.82574{col 75}{space 3}-28.41812
{txt}{space 14}d_sy73 {c |}{col 22}{res}{space 2}-42.47462{col 34}{space 2} 7.945783{col 45}{space 1}   -5.35{col 54}{space 3}0.000{col 62}{space 4}-58.11425{col 75}{space 3}-26.83499
{txt}{space 14}d_sy74 {c |}{col 22}{res}{space 2}-49.88648{col 34}{space 2} 5.936864{col 45}{space 1}   -8.40{col 54}{space 3}0.000{col 62}{space 4}-61.57197{col 75}{space 3}  -38.201
{txt}{space 14}d_sy75 {c |}{col 22}{res}{space 2}-50.87615{col 34}{space 2} 4.480459{col 45}{space 1}  -11.36{col 54}{space 3}0.000{col 62}{space 4}-59.69501{col 75}{space 3} -42.0573
{txt}{space 14}d_sy76 {c |}{col 22}{res}{space 2}-54.97006{col 34}{space 2} 3.458682{col 45}{space 1}  -15.89{col 54}{space 3}0.000{col 62}{space 4}-61.77776{col 75}{space 3}-48.16236
{txt}{space 14}d_sy77 {c |}{col 22}{res}{space 2}-22.95669{col 34}{space 2} 15.33915{col 45}{space 1}   -1.50{col 54}{space 3}0.136{col 62}{space 4}-53.14863{col 75}{space 3} 7.235259
{txt}{space 14}d_sy78 {c |}{col 22}{res}{space 2}-38.90808{col 34}{space 2} 9.332066{col 45}{space 1}   -4.17{col 54}{space 3}0.000{col 62}{space 4}-57.27632{col 75}{space 3}-20.53984
{txt}{space 14}d_sy79 {c |}{col 22}{res}{space 2} -36.5778{col 34}{space 2} 7.413938{col 45}{space 1}   -4.93{col 54}{space 3}0.000{col 62}{space 4} -51.1706{col 75}{space 3}-21.98499
{txt}{space 14}d_sy80 {c |}{col 22}{res}{space 2}-25.47912{col 34}{space 2} 8.375311{col 45}{space 1}   -3.04{col 54}{space 3}0.003{col 62}{space 4}-41.96419{col 75}{space 3} -8.99405
{txt}{space 14}d_sy81 {c |}{col 22}{res}{space 2} -28.7463{col 34}{space 2} 8.597761{col 45}{space 1}   -3.34{col 54}{space 3}0.001{col 62}{space 4}-45.66921{col 75}{space 3}-11.82339
{txt}{space 14}d_sy82 {c |}{col 22}{res}{space 2}-29.19528{col 34}{space 2} 7.202467{col 45}{space 1}   -4.05{col 54}{space 3}0.000{col 62}{space 4}-43.37185{col 75}{space 3}-15.01872
{txt}{space 14}d_sy83 {c |}{col 22}{res}{space 2}-10.22281{col 34}{space 2} 11.08745{col 45}{space 1}   -0.92{col 54}{space 3}0.357{col 62}{space 4}-32.04617{col 75}{space 3} 11.60055
{txt}{space 14}d_sy84 {c |}{col 22}{res}{space 2}-33.45653{col 34}{space 2} 6.205456{col 45}{space 1}   -5.39{col 54}{space 3}0.000{col 62}{space 4}-45.67068{col 75}{space 3}-21.24237
{txt}{space 14}d_sy85 {c |}{col 22}{res}{space 2}-11.34393{col 34}{space 2} 8.645807{col 45}{space 1}   -1.31{col 54}{space 3}0.191{col 62}{space 4}-28.36142{col 75}{space 3} 5.673552
{txt}{space 14}d_sy86 {c |}{col 22}{res}{space 2}-26.69564{col 34}{space 2}  6.73583{col 45}{space 1}   -3.96{col 54}{space 3}0.000{col 62}{space 4}-39.95372{col 75}{space 3}-13.43755
{txt}{space 14}d_sy87 {c |}{col 22}{res}{space 2}-26.14437{col 34}{space 2}  5.75485{col 45}{space 1}   -4.54{col 54}{space 3}0.000{col 62}{space 4} -37.4716{col 75}{space 3}-14.81714
{txt}{space 14}d_sy88 {c |}{col 22}{res}{space 2}-30.13662{col 34}{space 2} 5.049248{col 45}{space 1}   -5.97{col 54}{space 3}0.000{col 62}{space 4}-40.07502{col 75}{space 3}-20.19822
{txt}{space 14}d_sy89 {c |}{col 22}{res}{space 2} -16.9162{col 34}{space 2} 7.976849{col 45}{space 1}   -2.12{col 54}{space 3}0.035{col 62}{space 4}-32.61698{col 75}{space 3}-1.215425
{txt}{space 14}d_sy90 {c |}{col 22}{res}{space 2}-19.41642{col 34}{space 2} 8.834778{col 45}{space 1}   -2.20{col 54}{space 3}0.029{col 62}{space 4}-36.80586{col 75}{space 3}-2.026991
{txt}{space 14}d_sy91 {c |}{col 22}{res}{space 2}-10.77703{col 34}{space 2} 9.296999{col 45}{space 1}   -1.16{col 54}{space 3}0.247{col 62}{space 4}-29.07625{col 75}{space 3} 7.522196
{txt}{space 14}d_sy92 {c |}{col 22}{res}{space 2}-24.29236{col 34}{space 2} 5.616432{col 45}{space 1}   -4.33{col 54}{space 3}0.000{col 62}{space 4}-35.34714{col 75}{space 3}-13.23757
{txt}{space 14}d_sy93 {c |}{col 22}{res}{space 2}-35.85423{col 34}{space 2} 7.849325{col 45}{space 1}   -4.57{col 54}{space 3}0.000{col 62}{space 4}-51.30401{col 75}{space 3}-20.40446
{txt}{space 14}d_sy94 {c |}{col 22}{res}{space 2}-36.59842{col 34}{space 2} 6.636132{col 45}{space 1}   -5.52{col 54}{space 3}0.000{col 62}{space 4}-49.66027{col 75}{space 3}-23.53657
{txt}{space 14}d_sy95 {c |}{col 22}{res}{space 2}-36.48624{col 34}{space 2}  5.24486{col 45}{space 1}   -6.96{col 54}{space 3}0.000{col 62}{space 4}-46.80967{col 75}{space 3}-26.16282
{txt}{space 14}d_sy96 {c |}{col 22}{res}{space 2}-40.02832{col 34}{space 2} 4.908436{col 45}{space 1}   -8.16{col 54}{space 3}0.000{col 62}{space 4}-49.68957{col 75}{space 3}-30.36708
{txt}{space 14}d_sy97 {c |}{col 22}{res}{space 2}-36.08912{col 34}{space 2} 9.073788{col 45}{space 1}   -3.98{col 54}{space 3}0.000{col 62}{space 4}  -53.949{col 75}{space 3}-18.22925
{txt}{space 14}d_sy98 {c |}{col 22}{res}{space 2}-40.84679{col 34}{space 2} 9.443269{col 45}{space 1}   -4.33{col 54}{space 3}0.000{col 62}{space 4}-59.43392{col 75}{space 3}-22.25967
{txt}{space 14}d_sy99 {c |}{col 22}{res}{space 2}-36.91795{col 34}{space 2}  9.50328{col 45}{space 1}   -3.88{col 54}{space 3}0.000{col 62}{space 4} -55.6232{col 75}{space 3}-18.21271
{txt}{space 13}d_sy100 {c |}{col 22}{res}{space 2}-47.87255{col 34}{space 2}    4.911{col 45}{space 1}   -9.75{col 54}{space 3}0.000{col 62}{space 4}-57.53884{col 75}{space 3}-38.20626
{txt}{space 13}d_dist1 {c |}{col 22}{res}{space 2}-3.338279{col 34}{space 2}   2.2092{col 45}{space 1}   -1.51{col 54}{space 3}0.132{col 62}{space 4}-7.686633{col 75}{space 3} 1.010074
{txt}{space 13}d_dist2 {c |}{col 22}{res}{space 2}  5.89062{col 34}{space 2} 1.234703{col 45}{space 1}    4.77{col 54}{space 3}0.000{col 62}{space 4} 3.460363{col 75}{space 3} 8.320877
{txt}{space 13}d_dist3 {c |}{col 22}{res}{space 2} 14.10049{col 34}{space 2} 1.948562{col 45}{space 1}    7.24{col 54}{space 3}0.000{col 62}{space 4} 10.26515{col 75}{space 3} 17.93583
{txt}{space 13}d_dist4 {c |}{col 22}{res}{space 2} 18.03522{col 34}{space 2} 1.478094{col 45}{space 1}   12.20{col 54}{space 3}0.000{col 62}{space 4}  15.1259{col 75}{space 3} 20.94454
{txt}{space 13}d_dist5 {c |}{col 22}{res}{space 2}-4.134874{col 34}{space 2} 1.277734{col 45}{space 1}   -3.24{col 54}{space 3}0.001{col 62}{space 4}-6.649829{col 75}{space 3}-1.619918
{txt}{space 13}d_dist6 {c |}{col 22}{res}{space 2} 26.89801{col 34}{space 2} 1.235655{col 45}{space 1}   21.77{col 54}{space 3}0.000{col 62}{space 4} 24.46588{col 75}{space 3} 29.33014
{txt}{space 13}d_dist7 {c |}{col 22}{res}{space 2}  5.50131{col 34}{space 2} 1.339551{col 45}{space 1}    4.11{col 54}{space 3}0.000{col 62}{space 4} 2.864681{col 75}{space 3}  8.13794
{txt}{space 13}d_dist8 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 13}d_dist9 {c |}{col 22}{res}{space 2}  12.8906{col 34}{space 2} .7825609{col 45}{space 1}   16.47{col 54}{space 3}0.000{col 62}{space 4} 11.35029{col 75}{space 3} 14.43091
{txt}{space 12}d_dist10 {c |}{col 22}{res}{space 2} 4.601534{col 34}{space 2} .7653678{col 45}{space 1}    6.01{col 54}{space 3}0.000{col 62}{space 4} 3.095066{col 75}{space 3} 6.108002
{txt}{space 12}d_dist11 {c |}{col 22}{res}{space 2}-1.532828{col 34}{space 2} 1.013978{col 45}{space 1}   -1.51{col 54}{space 3}0.132{col 62}{space 4}-3.528635{col 75}{space 3} .4629776
{txt}{space 12}d_dist12 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 12}d_dist13 {c |}{col 22}{res}{space 2} 16.71085{col 34}{space 2} .0479609{col 45}{space 1}  348.43{col 54}{space 3}0.000{col 62}{space 4} 16.61645{col 75}{space 3} 16.80525
{txt}{space 12}d_dist14 {c |}{col 22}{res}{space 2} 14.69241{col 34}{space 2} .7739898{col 45}{space 1}   18.98{col 54}{space 3}0.000{col 62}{space 4} 13.16898{col 75}{space 3} 16.21585
{txt}{space 12}d_dist15 {c |}{col 22}{res}{space 2}  23.6612{col 34}{space 2} 1.404031{col 45}{space 1}   16.85{col 54}{space 3}0.000{col 62}{space 4} 20.89766{col 75}{space 3} 26.42475
{txt}{space 12}d_dist16 {c |}{col 22}{res}{space 2} 28.99767{col 34}{space 2} 1.032052{col 45}{space 1}   28.10{col 54}{space 3}0.000{col 62}{space 4} 26.96629{col 75}{space 3} 31.02906
{txt}{space 12}d_dist17 {c |}{col 22}{res}{space 2} 31.50514{col 34}{space 2} .8987324{col 45}{space 1}   35.06{col 54}{space 3}0.000{col 62}{space 4} 29.73617{col 75}{space 3}  33.2741
{txt}{space 12}d_dist18 {c |}{col 22}{res}{space 2} 9.261737{col 34}{space 2} 3.066611{col 45}{space 1}    3.02{col 54}{space 3}0.003{col 62}{space 4} 3.225746{col 75}{space 3} 15.29773
{txt}{space 12}d_dist19 {c |}{col 22}{res}{space 2}-3.638502{col 34}{space 2} .9119973{col 45}{space 1}   -3.99{col 54}{space 3}0.000{col 62}{space 4} -5.43358{col 75}{space 3}-1.843424
{txt}{space 12}d_dist20 {c |}{col 22}{res}{space 2} 19.74511{col 34}{space 2} .8390094{col 45}{space 1}   23.53{col 54}{space 3}0.000{col 62}{space 4}  18.0937{col 75}{space 3} 21.39653
{txt}{space 12}d_dist21 {c |}{col 22}{res}{space 2} 17.33784{col 34}{space 2} .8543299{col 45}{space 1}   20.29{col 54}{space 3}0.000{col 62}{space 4} 15.65627{col 75}{space 3} 19.01941
{txt}{space 12}d_dist22 {c |}{col 22}{res}{space 2} 16.21611{col 34}{space 2} .8252724{col 45}{space 1}   19.65{col 54}{space 3}0.000{col 62}{space 4} 14.59173{col 75}{space 3} 17.84049
{txt}{space 12}d_dist23 {c |}{col 22}{res}{space 2} 14.73862{col 34}{space 2} .9545812{col 45}{space 1}   15.44{col 54}{space 3}0.000{col 62}{space 4} 12.85972{col 75}{space 3} 16.61751
{txt}{space 12}d_dist24 {c |}{col 22}{res}{space 2} 16.38362{col 34}{space 2} .9545812{col 45}{space 1}   17.16{col 54}{space 3}0.000{col 62}{space 4} 14.50472{col 75}{space 3} 18.26251
{txt}{space 12}d_dist25 {c |}{col 22}{res}{space 2} 15.10295{col 34}{space 2} .8092117{col 45}{space 1}   18.66{col 54}{space 3}0.000{col 62}{space 4} 13.51019{col 75}{space 3} 16.69572
{txt}{space 12}d_dist26 {c |}{col 22}{res}{space 2} 15.51541{col 34}{space 2} .7979963{col 45}{space 1}   19.44{col 54}{space 3}0.000{col 62}{space 4} 13.94472{col 75}{space 3}  17.0861
{txt}{space 12}d_dist27 {c |}{col 22}{res}{space 2} 18.45955{col 34}{space 2} .7210564{col 45}{space 1}   25.60{col 54}{space 3}0.000{col 62}{space 4}  17.0403{col 75}{space 3}  19.8788
{txt}{space 12}d_dist28 {c |}{col 22}{res}{space 2} 18.50917{col 34}{space 2} 1.211934{col 45}{space 1}   15.27{col 54}{space 3}0.000{col 62}{space 4} 16.12373{col 75}{space 3} 20.89461
{txt}{space 12}d_dist29 {c |}{col 22}{res}{space 2}  20.3632{col 34}{space 2} .8441851{col 45}{space 1}   24.12{col 54}{space 3}0.000{col 62}{space 4} 18.70159{col 75}{space 3}  22.0248
{txt}{space 12}d_dist30 {c |}{col 22}{res}{space 2} 43.01434{col 34}{space 2} 1.363687{col 45}{space 1}   31.54{col 54}{space 3}0.000{col 62}{space 4}  40.3302{col 75}{space 3} 45.69847
{txt}{space 12}d_dist31 {c |}{col 22}{res}{space 2} 6.231318{col 34}{space 2} 1.362512{col 45}{space 1}    4.57{col 54}{space 3}0.000{col 62}{space 4} 3.549495{col 75}{space 3} 8.913141
{txt}{space 12}d_dist32 {c |}{col 22}{res}{space 2} 3.447511{col 34}{space 2}  .839065{col 45}{space 1}    4.11{col 54}{space 3}0.000{col 62}{space 4} 1.795986{col 75}{space 3} 5.099037
{txt}{space 12}d_dist33 {c |}{col 22}{res}{space 2} 3.593055{col 34}{space 2} 1.034786{col 45}{space 1}    3.47{col 54}{space 3}0.001{col 62}{space 4} 1.556293{col 75}{space 3} 5.629816
{txt}{space 12}d_dist34 {c |}{col 22}{res}{space 2}  .014558{col 34}{space 2} .9336676{col 45}{space 1}    0.02{col 54}{space 3}0.988{col 62}{space 4}-1.823174{col 75}{space 3}  1.85229
{txt}{space 12}d_dist35 {c |}{col 22}{res}{space 2} 9.805692{col 34}{space 2} 1.273158{col 45}{space 1}    7.70{col 54}{space 3}0.000{col 62}{space 4} 7.299743{col 75}{space 3} 12.31164
{txt}{space 12}d_dist36 {c |}{col 22}{res}{space 2} 25.15727{col 34}{space 2} .7786438{col 45}{space 1}   32.31{col 54}{space 3}0.000{col 62}{space 4} 23.62467{col 75}{space 3} 26.68986
{txt}{space 12}d_dist37 {c |}{col 22}{res}{space 2} 12.04067{col 34}{space 2} .9210785{col 45}{space 1}   13.07{col 54}{space 3}0.000{col 62}{space 4} 10.22772{col 75}{space 3} 13.85363
{txt}{space 12}d_dist38 {c |}{col 22}{res}{space 2} 19.09182{col 34}{space 2} 1.712488{col 45}{space 1}   11.15{col 54}{space 3}0.000{col 62}{space 4} 15.72114{col 75}{space 3}  22.4625
{txt}{space 12}d_dist39 {c |}{col 22}{res}{space 2} 33.88112{col 34}{space 2} .9545812{col 45}{space 1}   35.49{col 54}{space 3}0.000{col 62}{space 4} 32.00222{col 75}{space 3} 35.76001
{txt}{space 12}d_dist40 {c |}{col 22}{res}{space 2} 35.62657{col 34}{space 2} .9489286{col 45}{space 1}   37.54{col 54}{space 3}0.000{col 62}{space 4}  33.7588{col 75}{space 3} 37.49434
{txt}{space 12}d_dist41 {c |}{col 22}{res}{space 2} 37.22666{col 34}{space 2} .7411434{col 45}{space 1}   50.23{col 54}{space 3}0.000{col 62}{space 4} 35.76788{col 75}{space 3} 38.68545
{txt}{space 12}d_dist42 {c |}{col 22}{res}{space 2} 19.27612{col 34}{space 2} .9545812{col 45}{space 1}   20.19{col 54}{space 3}0.000{col 62}{space 4} 17.39722{col 75}{space 3} 21.15501
{txt}{space 12}d_dist43 {c |}{col 22}{res}{space 2} 30.30612{col 34}{space 2} .9545812{col 45}{space 1}   31.75{col 54}{space 3}0.000{col 62}{space 4} 28.42722{col 75}{space 3} 32.18501
{txt}{space 12}d_dist44 {c |}{col 22}{res}{space 2} 8.567735{col 34}{space 2} .8667223{col 45}{space 1}    9.89{col 54}{space 3}0.000{col 62}{space 4} 6.861771{col 75}{space 3}  10.2737
{txt}{space 12}d_dist45 {c |}{col 22}{res}{space 2} 31.23362{col 34}{space 2} .9545812{col 45}{space 1}   32.72{col 54}{space 3}0.000{col 62}{space 4} 29.35472{col 75}{space 3} 33.11251
{txt}{space 12}d_dist46 {c |}{col 22}{res}{space 2} 30.03273{col 34}{space 2} .9264255{col 45}{space 1}   32.42{col 54}{space 3}0.000{col 62}{space 4} 28.20926{col 75}{space 3} 31.85621
{txt}{space 12}d_dist47 {c |}{col 22}{res}{space 2} 8.433619{col 34}{space 2} .9545812{col 45}{space 1}    8.83{col 54}{space 3}0.000{col 62}{space 4} 6.554723{col 75}{space 3} 10.31251
{txt}{space 12}d_dist48 {c |}{col 22}{res}{space 2} 9.179309{col 34}{space 2} .8552243{col 45}{space 1}   10.73{col 54}{space 3}0.000{col 62}{space 4} 7.495976{col 75}{space 3} 10.86264
{txt}{space 12}d_dist49 {c |}{col 22}{res}{space 2} 14.96121{col 34}{space 2} 1.259605{col 45}{space 1}   11.88{col 54}{space 3}0.000{col 62}{space 4} 12.48194{col 75}{space 3} 17.44048
{txt}{space 12}d_dist50 {c |}{col 22}{res}{space 2}  15.6139{col 34}{space 2} .9600121{col 45}{space 1}   16.26{col 54}{space 3}0.000{col 62}{space 4} 13.72432{col 75}{space 3} 17.50349
{txt}{space 12}d_dist51 {c |}{col 22}{res}{space 2}   7.5181{col 34}{space 2} 1.898886{col 45}{space 1}    3.96{col 54}{space 3}0.000{col 62}{space 4} 3.780535{col 75}{space 3} 11.25567
{txt}{space 12}d_dist52 {c |}{col 22}{res}{space 2} .4045846{col 34}{space 2} .7846203{col 45}{space 1}    0.52{col 54}{space 3}0.607{col 62}{space 4}-1.139778{col 75}{space 3} 1.948947
{txt}{space 12}d_dist53 {c |}{col 22}{res}{space 2} 2.267252{col 34}{space 2} 1.139424{col 45}{space 1}    1.99{col 54}{space 3}0.048{col 62}{space 4}  .024531{col 75}{space 3} 4.509973
{txt}{space 12}d_dist54 {c |}{col 22}{res}{space 2} 3.739931{col 34}{space 2} .7897986{col 45}{space 1}    4.74{col 54}{space 3}0.000{col 62}{space 4} 2.185376{col 75}{space 3} 5.294486
{txt}{space 12}d_dist55 {c |}{col 22}{res}{space 2} 6.211119{col 34}{space 2} .9545812{col 45}{space 1}    6.51{col 54}{space 3}0.000{col 62}{space 4} 4.332223{col 75}{space 3} 8.090014
{txt}{space 12}d_dist56 {c |}{col 22}{res}{space 2} 5.463299{col 34}{space 2} 1.184365{col 45}{space 1}    4.61{col 54}{space 3}0.000{col 62}{space 4} 3.132121{col 75}{space 3} 7.794476
{txt}{space 12}d_dist57 {c |}{col 22}{res}{space 2} 6.674953{col 34}{space 2} .7634807{col 45}{space 1}    8.74{col 54}{space 3}0.000{col 62}{space 4} 5.172199{col 75}{space 3} 8.177707
{txt}{space 12}d_dist58 {c |}{col 22}{res}{space 2}-.0163812{col 34}{space 2} .9545812{col 45}{space 1}   -0.02{col 54}{space 3}0.986{col 62}{space 4}-1.895277{col 75}{space 3} 1.862515
{txt}{space 12}d_dist59 {c |}{col 22}{res}{space 2}   8.9843{col 34}{space 2} .9516069{col 45}{space 1}    9.44{col 54}{space 3}0.000{col 62}{space 4} 7.111258{col 75}{space 3} 10.85734
{txt}{space 12}d_dist60 {c |}{col 22}{res}{space 2} 10.86074{col 34}{space 2}  .906594{col 45}{space 1}   11.98{col 54}{space 3}0.000{col 62}{space 4} 9.076295{col 75}{space 3} 12.64518
{txt}{space 12}d_dist61 {c |}{col 22}{res}{space 2} 11.56279{col 34}{space 2} .9189145{col 45}{space 1}   12.58{col 54}{space 3}0.000{col 62}{space 4} 9.754097{col 75}{space 3} 13.37148
{txt}{space 12}d_dist62 {c |}{col 22}{res}{space 2} 20.24704{col 34}{space 2} 1.778893{col 45}{space 1}   11.38{col 54}{space 3}0.000{col 62}{space 4} 16.74566{col 75}{space 3} 23.74842
{txt}{space 12}d_dist63 {c |}{col 22}{res}{space 2} 5.735035{col 34}{space 2} 2.136257{col 45}{space 1}    2.68{col 54}{space 3}0.008{col 62}{space 4} 1.530255{col 75}{space 3} 9.939814
{txt}{space 12}d_dist64 {c |}{col 22}{res}{space 2}-2.593174{col 34}{space 2} 2.175257{col 45}{space 1}   -1.19{col 54}{space 3}0.234{col 62}{space 4}-6.874717{col 75}{space 3} 1.688369
{txt}{space 12}d_dist65 {c |}{col 22}{res}{space 2}-11.64856{col 34}{space 2} 3.201808{col 45}{space 1}   -3.64{col 54}{space 3}0.000{col 62}{space 4}-17.95065{col 75}{space 3}-5.346462
{txt}{space 12}d_dist66 {c |}{col 22}{res}{space 2} 9.233146{col 34}{space 2} .0488845{col 45}{space 1}  188.88{col 54}{space 3}0.000{col 62}{space 4} 9.136927{col 75}{space 3} 9.329365
{txt}{space 12}d_dist67 {c |}{col 22}{res}{space 2} .9271406{col 34}{space 2} 2.106891{col 45}{space 1}    0.44{col 54}{space 3}0.660{col 62}{space 4}-3.219838{col 75}{space 3} 5.074119
{txt}{space 12}d_dist68 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 12}d_dist69 {c |}{col 22}{res}{space 2}-26.66927{col 34}{space 2} 3.070836{col 45}{space 1}   -8.68{col 54}{space 3}0.000{col 62}{space 4}-32.71358{col 75}{space 3}-20.62497
{txt}{space 12}d_dist70 {c |}{col 22}{res}{space 2}-27.66202{col 34}{space 2} 3.238991{col 45}{space 1}   -8.54{col 54}{space 3}0.000{col 62}{space 4}-34.03731{col 75}{space 3}-21.28674
{txt}{space 12}d_dist71 {c |}{col 22}{res}{space 2}-52.64413{col 34}{space 2} 6.419158{col 45}{space 1}   -8.20{col 54}{space 3}0.000{col 62}{space 4}-65.27891{col 75}{space 3}-40.00934
{txt}{space 12}d_dist72 {c |}{col 22}{res}{space 2}-35.25136{col 34}{space 2} 6.030402{col 45}{space 1}   -5.85{col 54}{space 3}0.000{col 62}{space 4}-47.12096{col 75}{space 3}-23.38176
{txt}{space 12}d_dist73 {c |}{col 22}{res}{space 2} 31.48216{col 34}{space 2} 1.123428{col 45}{space 1}   28.02{col 54}{space 3}0.000{col 62}{space 4} 29.27093{col 75}{space 3}  33.6934
{txt}{space 12}d_dist74 {c |}{col 22}{res}{space 2} 37.54883{col 34}{space 2}  1.12516{col 45}{space 1}   33.37{col 54}{space 3}0.000{col 62}{space 4} 35.33418{col 75}{space 3} 39.76348
{txt}{space 12}d_dist75 {c |}{col 22}{res}{space 2} 22.65633{col 34}{space 2}  1.12516{col 45}{space 1}   20.14{col 54}{space 3}0.000{col 62}{space 4} 20.44168{col 75}{space 3} 24.87098
{txt}{space 12}d_dist76 {c |}{col 22}{res}{space 2} 33.13133{col 34}{space 2}  1.12516{col 45}{space 1}   29.45{col 54}{space 3}0.000{col 62}{space 4} 30.91668{col 75}{space 3} 35.34597
{txt}{space 12}d_dist77 {c |}{col 22}{res}{space 2} 23.43955{col 34}{space 2} .7699307{col 45}{space 1}   30.44{col 54}{space 3}0.000{col 62}{space 4}  21.9241{col 75}{space 3}   24.955
{txt}{space 12}d_dist78 {c |}{col 22}{res}{space 2} 6.068996{col 34}{space 2}  1.36507{col 45}{space 1}    4.45{col 54}{space 3}0.000{col 62}{space 4} 3.382137{col 75}{space 3} 8.755855
{txt}{space 12}d_dist79 {c |}{col 22}{res}{space 2}  32.2217{col 34}{space 2} 1.120152{col 45}{space 1}   28.77{col 54}{space 3}0.000{col 62}{space 4} 30.01692{col 75}{space 3} 34.42649
{txt}{space 12}d_dist80 {c |}{col 22}{res}{space 2}-.3804768{col 34}{space 2}  1.20887{col 45}{space 1}   -0.31{col 54}{space 3}0.753{col 62}{space 4}-2.759888{col 75}{space 3} 1.998934
{txt}{space 12}d_dist81 {c |}{col 22}{res}{space 2} 20.72067{col 34}{space 2} 1.117358{col 45}{space 1}   18.54{col 54}{space 3}0.000{col 62}{space 4} 18.52138{col 75}{space 3} 22.91996
{txt}{space 12}d_dist82 {c |}{col 22}{res}{space 2} 2.290916{col 34}{space 2} 1.602083{col 45}{space 1}    1.43{col 54}{space 3}0.154{col 62}{space 4}-.8624518{col 75}{space 3} 5.444285
{txt}{space 12}d_dist83 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 12}d_dist84 {c |}{col 22}{res}{space 2} 23.63548{col 34}{space 2} 1.126244{col 45}{space 1}   20.99{col 54}{space 3}0.000{col 62}{space 4} 21.41871{col 75}{space 3} 25.85226
{txt}{space 12}d_dist85 {c |}{col 22}{res}{space 2} 7.424621{col 34}{space 2} 1.118442{col 45}{space 1}    6.64{col 54}{space 3}0.000{col 62}{space 4} 5.223199{col 75}{space 3} 9.626043
{txt}{space 12}d_dist86 {c |}{col 22}{res}{space 2}  5.15094{col 34}{space 2} .9183375{col 45}{space 1}    5.61{col 54}{space 3}0.000{col 62}{space 4} 3.343382{col 75}{space 3} 6.958497
{txt}{space 12}d_dist87 {c |}{col 22}{res}{space 2} 9.176443{col 34}{space 2}  .887969{col 45}{space 1}   10.33{col 54}{space 3}0.000{col 62}{space 4} 7.428659{col 75}{space 3} 10.92423
{txt}{space 12}d_dist88 {c |}{col 22}{res}{space 2} 13.16562{col 34}{space 2} 1.095533{col 45}{space 1}   12.02{col 54}{space 3}0.000{col 62}{space 4} 11.00929{col 75}{space 3} 15.32195
{txt}{space 12}d_dist89 {c |}{col 22}{res}{space 2} 15.26277{col 34}{space 2} 1.415885{col 45}{space 1}   10.78{col 54}{space 3}0.000{col 62}{space 4} 12.47589{col 75}{space 3} 18.04964
{txt}{space 12}d_dist90 {c |}{col 22}{res}{space 2} 17.66985{col 34}{space 2} .3999092{col 45}{space 1}   44.18{col 54}{space 3}0.000{col 62}{space 4} 16.88271{col 75}{space 3} 18.45699
{txt}{space 12}d_dist91 {c |}{col 22}{res}{space 2} 13.59605{col 34}{space 2} 1.117045{col 45}{space 1}   12.17{col 54}{space 3}0.000{col 62}{space 4} 11.39737{col 75}{space 3} 15.79472
{txt}{space 12}d_dist92 {c |}{col 22}{res}{space 2} 8.826093{col 34}{space 2} 1.011733{col 45}{space 1}    8.72{col 54}{space 3}0.000{col 62}{space 4} 6.834705{col 75}{space 3} 10.81748
{txt}{space 12}d_dist93 {c |}{col 22}{res}{space 2}-4.887091{col 34}{space 2} .6669542{col 45}{space 1}   -7.33{col 54}{space 3}0.000{col 62}{space 4}-6.199852{col 75}{space 3}-3.574329
{txt}{space 12}d_dist94 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 12}d_dist95 {c |}{col 22}{res}{space 2} 4.030444{col 34}{space 2} .1611314{col 45}{space 1}   25.01{col 54}{space 3}0.000{col 62}{space 4}  3.71329{col 75}{space 3} 4.347598
{txt}{space 12}d_dist96 {c |}{col 22}{res}{space 2} 9.272002{col 34}{space 2} .6802681{col 45}{space 1}   13.63{col 54}{space 3}0.000{col 62}{space 4} 7.933035{col 75}{space 3} 10.61097
{txt}{space 12}d_dist97 {c |}{col 22}{res}{space 2} 5.689012{col 34}{space 2} .6697896{col 45}{space 1}    8.49{col 54}{space 3}0.000{col 62}{space 4}  4.37067{col 75}{space 3} 7.007355
{txt}{space 12}d_dist98 {c |}{col 22}{res}{space 2}-.8440423{col 34}{space 2} .7935793{col 45}{space 1}   -1.06{col 54}{space 3}0.288{col 62}{space 4}-2.406039{col 75}{space 3} .7179545
{txt}{space 12}d_dist99 {c |}{col 22}{res}{space 2}-7.342756{col 34}{space 2} .5938677{col 45}{space 1}  -12.36{col 54}{space 3}0.000{col 62}{space 4}-8.511662{col 75}{space 3} -6.17385
{txt}{space 11}d_dist100 {c |}{col 22}{res}{space 2}-8.388434{col 34}{space 2}   1.5496{col 45}{space 1}   -5.41{col 54}{space 3}0.000{col 62}{space 4} -11.4385{col 75}{space 3}-5.338367
{txt}{space 11}d_dist101 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist102 {c |}{col 22}{res}{space 2}-37.34003{col 34}{space 2} 1.450451{col 45}{space 1}  -25.74{col 54}{space 3}0.000{col 62}{space 4}-40.19494{col 75}{space 3}-34.48511
{txt}{space 11}d_dist103 {c |}{col 22}{res}{space 2} -28.1498{col 34}{space 2} 1.723341{col 45}{space 1}  -16.33{col 54}{space 3}0.000{col 62}{space 4}-31.54184{col 75}{space 3}-24.75776
{txt}{space 11}d_dist104 {c |}{col 22}{res}{space 2}-22.12815{col 34}{space 2}  .980848{col 45}{space 1}  -22.56{col 54}{space 3}0.000{col 62}{space 4}-24.05874{col 75}{space 3}-20.19755
{txt}{space 11}d_dist105 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist106 {c |}{col 22}{res}{space 2} 6.736572{col 34}{space 2} .6348744{col 45}{space 1}   10.61{col 54}{space 3}0.000{col 62}{space 4} 5.486953{col 75}{space 3} 7.986191
{txt}{space 11}d_dist107 {c |}{col 22}{res}{space 2} 5.425083{col 34}{space 2}  1.89669{col 45}{space 1}    2.86{col 54}{space 3}0.005{col 62}{space 4}  1.69184{col 75}{space 3} 9.158326
{txt}{space 11}d_dist108 {c |}{col 22}{res}{space 2} 20.00282{col 34}{space 2} .7280875{col 45}{space 1}   27.47{col 54}{space 3}0.000{col 62}{space 4} 18.56973{col 75}{space 3} 21.43591
{txt}{space 11}d_dist109 {c |}{col 22}{res}{space 2} 15.20533{col 34}{space 2} .9409931{col 45}{space 1}   16.16{col 54}{space 3}0.000{col 62}{space 4} 13.35318{col 75}{space 3} 17.05748
{txt}{space 11}d_dist110 {c |}{col 22}{res}{space 2} .8693964{col 34}{space 2} .5647117{col 45}{space 1}    1.54{col 54}{space 3}0.125{col 62}{space 4}-.2421218{col 75}{space 3} 1.980915
{txt}{space 11}d_dist111 {c |}{col 22}{res}{space 2} 20.45208{col 34}{space 2} .6768151{col 45}{space 1}   30.22{col 54}{space 3}0.000{col 62}{space 4} 19.11991{col 75}{space 3} 21.78425
{txt}{space 11}d_dist112 {c |}{col 22}{res}{space 2} 13.30289{col 34}{space 2} .5508904{col 45}{space 1}   24.15{col 54}{space 3}0.000{col 62}{space 4} 12.21858{col 75}{space 3} 14.38721
{txt}{space 11}d_dist113 {c |}{col 22}{res}{space 2} 13.20561{col 34}{space 2} 2.081144{col 45}{space 1}    6.35{col 54}{space 3}0.000{col 62}{space 4}  9.10931{col 75}{space 3} 17.30191
{txt}{space 11}d_dist114 {c |}{col 22}{res}{space 2} 18.47271{col 34}{space 2} 2.048473{col 45}{space 1}    9.02{col 54}{space 3}0.000{col 62}{space 4} 14.44071{col 75}{space 3} 22.50471
{txt}{space 11}d_dist115 {c |}{col 22}{res}{space 2} 11.17117{col 34}{space 2} 1.698177{col 45}{space 1}    6.58{col 54}{space 3}0.000{col 62}{space 4} 7.828655{col 75}{space 3} 14.51368
{txt}{space 11}d_dist116 {c |}{col 22}{res}{space 2} 10.85774{col 34}{space 2} 1.705956{col 45}{space 1}    6.36{col 54}{space 3}0.000{col 62}{space 4} 7.499914{col 75}{space 3} 14.21556
{txt}{space 11}d_dist117 {c |}{col 22}{res}{space 2} 10.13048{col 34}{space 2} 2.169504{col 45}{space 1}    4.67{col 54}{space 3}0.000{col 62}{space 4}  5.86026{col 75}{space 3}  14.4007
{txt}{space 11}d_dist118 {c |}{col 22}{res}{space 2}-4.790295{col 34}{space 2} 1.435044{col 45}{space 1}   -3.34{col 54}{space 3}0.001{col 62}{space 4}-7.614883{col 75}{space 3}-1.965708
{txt}{space 11}d_dist119 {c |}{col 22}{res}{space 2} 8.585022{col 34}{space 2} 1.692246{col 45}{space 1}    5.07{col 54}{space 3}0.000{col 62}{space 4} 5.254185{col 75}{space 3} 11.91586
{txt}{space 11}d_dist120 {c |}{col 22}{res}{space 2} 29.02201{col 34}{space 2} 1.935245{col 45}{space 1}   15.00{col 54}{space 3}0.000{col 62}{space 4} 25.21288{col 75}{space 3} 32.83114
{txt}{space 11}d_dist121 {c |}{col 22}{res}{space 2} 16.36672{col 34}{space 2} 1.645386{col 45}{space 1}    9.95{col 54}{space 3}0.000{col 62}{space 4} 13.12812{col 75}{space 3} 19.60533
{txt}{space 11}d_dist122 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist123 {c |}{col 22}{res}{space 2} 17.46953{col 34}{space 2} 2.088261{col 45}{space 1}    8.37{col 54}{space 3}0.000{col 62}{space 4} 13.35922{col 75}{space 3} 21.57984
{txt}{space 11}d_dist124 {c |}{col 22}{res}{space 2} 16.73836{col 34}{space 2}  2.07739{col 45}{space 1}    8.06{col 54}{space 3}0.000{col 62}{space 4} 12.64945{col 75}{space 3} 20.82727
{txt}{space 11}d_dist125 {c |}{col 22}{res}{space 2} 14.43571{col 34}{space 2}  2.07314{col 45}{space 1}    6.96{col 54}{space 3}0.000{col 62}{space 4} 10.35517{col 75}{space 3} 18.51626
{txt}{space 11}d_dist126 {c |}{col 22}{res}{space 2} 14.71753{col 34}{space 2} 1.236656{col 45}{space 1}   11.90{col 54}{space 3}0.000{col 62}{space 4} 12.28343{col 75}{space 3} 17.15164
{txt}{space 11}d_dist127 {c |}{col 22}{res}{space 2} 17.22534{col 34}{space 2}  1.25253{col 45}{space 1}   13.75{col 54}{space 3}0.000{col 62}{space 4}    14.76{col 75}{space 3} 19.69069
{txt}{space 11}d_dist128 {c |}{col 22}{res}{space 2} 13.41199{col 34}{space 2} 1.235629{col 45}{space 1}   10.85{col 54}{space 3}0.000{col 62}{space 4} 10.97991{col 75}{space 3} 15.84407
{txt}{space 11}d_dist129 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist130 {c |}{col 22}{res}{space 2}  10.6146{col 34}{space 2} 1.232957{col 45}{space 1}    8.61{col 54}{space 3}0.000{col 62}{space 4} 8.187777{col 75}{space 3} 13.04142
{txt}{space 11}d_dist131 {c |}{col 22}{res}{space 2} 2.413207{col 34}{space 2} 1.252673{col 45}{space 1}    1.93{col 54}{space 3}0.055{col 62}{space 4} -.052421{col 75}{space 3} 4.878834
{txt}{space 11}d_dist132 {c |}{col 22}{res}{space 2} 19.98678{col 34}{space 2} 1.285735{col 45}{space 1}   15.55{col 54}{space 3}0.000{col 62}{space 4} 17.45607{col 75}{space 3} 22.51748
{txt}{space 11}d_dist133 {c |}{col 22}{res}{space 2} 7.130706{col 34}{space 2} 1.252673{col 45}{space 1}    5.69{col 54}{space 3}0.000{col 62}{space 4} 4.665079{col 75}{space 3} 9.596334
{txt}{space 11}d_dist134 {c |}{col 22}{res}{space 2} 20.75571{col 34}{space 2} 1.252673{col 45}{space 1}   16.57{col 54}{space 3}0.000{col 62}{space 4} 18.29008{col 75}{space 3} 23.22133
{txt}{space 11}d_dist135 {c |}{col 22}{res}{space 2} 36.04318{col 34}{space 2} 2.078161{col 45}{space 1}   17.34{col 54}{space 3}0.000{col 62}{space 4} 31.95275{col 75}{space 3} 40.13361
{txt}{space 11}d_dist136 {c |}{col 22}{res}{space 2} 37.89571{col 34}{space 2} 1.252673{col 45}{space 1}   30.25{col 54}{space 3}0.000{col 62}{space 4} 35.43008{col 75}{space 3} 40.36134
{txt}{space 11}d_dist137 {c |}{col 22}{res}{space 2} 26.44894{col 34}{space 2} 1.235246{col 45}{space 1}   21.41{col 54}{space 3}0.000{col 62}{space 4} 24.01761{col 75}{space 3} 28.88026
{txt}{space 11}d_dist138 {c |}{col 22}{res}{space 2}-16.44707{col 34}{space 2} 3.881285{col 45}{space 1}   -4.24{col 54}{space 3}0.000{col 62}{space 4}-24.08658{col 75}{space 3}-8.807567
{txt}{space 11}d_dist139 {c |}{col 22}{res}{space 2}-16.52148{col 34}{space 2} 1.939628{col 45}{space 1}   -8.52{col 54}{space 3}0.000{col 62}{space 4}-20.33924{col 75}{space 3}-12.70372
{txt}{space 11}d_dist140 {c |}{col 22}{res}{space 2} -10.7981{col 34}{space 2} 1.757625{col 45}{space 1}   -6.14{col 54}{space 3}0.000{col 62}{space 4}-14.25763{col 75}{space 3}-7.338584
{txt}{space 11}d_dist141 {c |}{col 22}{res}{space 2}-8.918206{col 34}{space 2} 1.085688{col 45}{space 1}   -8.21{col 54}{space 3}0.000{col 62}{space 4}-11.05516{col 75}{space 3}-6.781253
{txt}{space 11}d_dist142 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist143 {c |}{col 22}{res}{space 2}-21.86733{col 34}{space 2} 1.835607{col 45}{space 1}  -11.91{col 54}{space 3}0.000{col 62}{space 4}-25.48034{col 75}{space 3}-18.25432
{txt}{space 11}d_dist144 {c |}{col 22}{res}{space 2}-8.543655{col 34}{space 2} 2.469383{col 45}{space 1}   -3.46{col 54}{space 3}0.001{col 62}{space 4}-13.40413{col 75}{space 3}-3.683184
{txt}{space 11}d_dist145 {c |}{col 22}{res}{space 2}-12.82363{col 34}{space 2} 1.055733{col 45}{space 1}  -12.15{col 54}{space 3}0.000{col 62}{space 4}-14.90162{col 75}{space 3}-10.74564
{txt}{space 11}d_dist146 {c |}{col 22}{res}{space 2} 11.63987{col 34}{space 2}  1.71212{col 45}{space 1}    6.80{col 54}{space 3}0.000{col 62}{space 4}  8.26991{col 75}{space 3} 15.00982
{txt}{space 11}d_dist147 {c |}{col 22}{res}{space 2}-4.173144{col 34}{space 2} 1.692543{col 45}{space 1}   -2.47{col 54}{space 3}0.014{col 62}{space 4}-7.504566{col 75}{space 3}-.8417228
{txt}{space 11}d_dist148 {c |}{col 22}{res}{space 2}-7.358539{col 34}{space 2} 2.550714{col 45}{space 1}   -2.88{col 54}{space 3}0.004{col 62}{space 4}-12.37909{col 75}{space 3}-2.337985
{txt}{space 11}d_dist149 {c |}{col 22}{res}{space 2}-7.459316{col 34}{space 2} 1.690594{col 45}{space 1}   -4.41{col 54}{space 3}0.000{col 62}{space 4} -10.7869{col 75}{space 3}-4.131731
{txt}{space 11}d_dist150 {c |}{col 22}{res}{space 2}-9.016118{col 34}{space 2} 2.485078{col 45}{space 1}   -3.63{col 54}{space 3}0.000{col 62}{space 4}-13.90748{col 75}{space 3}-4.124756
{txt}{space 11}d_dist151 {c |}{col 22}{res}{space 2}-5.088311{col 34}{space 2} 1.751863{col 45}{space 1}   -2.90{col 54}{space 3}0.004{col 62}{space 4}-8.536491{col 75}{space 3}-1.640131
{txt}{space 11}d_dist152 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist153 {c |}{col 22}{res}{space 2} 2.696444{col 34}{space 2} 1.785256{col 45}{space 1}    1.51{col 54}{space 3}0.132{col 62}{space 4}-.8174626{col 75}{space 3} 6.210351
{txt}{space 11}d_dist154 {c |}{col 22}{res}{space 2} 7.555787{col 34}{space 2} 2.187217{col 45}{space 1}    3.45{col 54}{space 3}0.001{col 62}{space 4} 3.250702{col 75}{space 3} 11.86087
{txt}{space 11}d_dist155 {c |}{col 22}{res}{space 2} 3.279405{col 34}{space 2} .0448772{col 45}{space 1}   73.08{col 54}{space 3}0.000{col 62}{space 4} 3.191073{col 75}{space 3} 3.367736
{txt}{space 11}d_dist156 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist157 {c |}{col 22}{res}{space 2}-13.26976{col 34}{space 2} .5847459{col 45}{space 1}  -22.69{col 54}{space 3}0.000{col 62}{space 4}-14.42071{col 75}{space 3}-12.11881
{txt}{space 11}d_dist158 {c |}{col 22}{res}{space 2}-57.33543{col 34}{space 2} 3.960998{col 45}{space 1}  -14.47{col 54}{space 3}0.000{col 62}{space 4}-65.13184{col 75}{space 3}-49.53903
{txt}{space 11}d_dist159 {c |}{col 22}{res}{space 2}-57.63054{col 34}{space 2} 3.824878{col 45}{space 1}  -15.07{col 54}{space 3}0.000{col 62}{space 4}-65.15902{col 75}{space 3}-50.10206
{txt}{space 11}d_dist160 {c |}{col 22}{res}{space 2} 22.09517{col 34}{space 2} .6589375{col 45}{space 1}   33.53{col 54}{space 3}0.000{col 62}{space 4} 20.79819{col 75}{space 3} 23.39215
{txt}{space 11}d_dist161 {c |}{col 22}{res}{space 2} 8.256145{col 34}{space 2} .6754955{col 45}{space 1}   12.22{col 54}{space 3}0.000{col 62}{space 4} 6.926572{col 75}{space 3} 9.585719
{txt}{space 11}d_dist162 {c |}{col 22}{res}{space 2} .9300069{col 34}{space 2} .6109234{col 45}{space 1}    1.52{col 54}{space 3}0.129{col 62}{space 4}-.2724696{col 75}{space 3} 2.132483
{txt}{space 11}d_dist163 {c |}{col 22}{res}{space 2} 11.86961{col 34}{space 2} .5995644{col 45}{space 1}   19.80{col 54}{space 3}0.000{col 62}{space 4} 10.68949{col 75}{space 3} 13.04972
{txt}{space 11}d_dist164 {c |}{col 22}{res}{space 2} 3.482989{col 34}{space 2} .3639174{col 45}{space 1}    9.57{col 54}{space 3}0.000{col 62}{space 4} 2.766693{col 75}{space 3} 4.199286
{txt}{space 11}d_dist165 {c |}{col 22}{res}{space 2} 8.926763{col 34}{space 2} .8558727{col 45}{space 1}   10.43{col 54}{space 3}0.000{col 62}{space 4} 7.242154{col 75}{space 3} 10.61137
{txt}{space 11}d_dist166 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist167 {c |}{col 22}{res}{space 2} 13.54907{col 34}{space 2} .3776319{col 45}{space 1}   35.88{col 54}{space 3}0.000{col 62}{space 4} 12.80578{col 75}{space 3} 14.29236
{txt}{space 11}d_dist168 {c |}{col 22}{res}{space 2} 11.79659{col 34}{space 2} .3720408{col 45}{space 1}   31.71{col 54}{space 3}0.000{col 62}{space 4}  11.0643{col 75}{space 3} 12.52887
{txt}{space 11}d_dist169 {c |}{col 22}{res}{space 2} 40.55142{col 34}{space 2} .5818478{col 45}{space 1}   69.69{col 54}{space 3}0.000{col 62}{space 4} 39.40617{col 75}{space 3} 41.69667
{txt}{space 11}d_dist170 {c |}{col 22}{res}{space 2} 9.916265{col 34}{space 2} .3673112{col 45}{space 1}   27.00{col 54}{space 3}0.000{col 62}{space 4} 9.193289{col 75}{space 3} 10.63924
{txt}{space 11}d_dist171 {c |}{col 22}{res}{space 2} 4.717848{col 34}{space 2} .5154936{col 45}{space 1}    9.15{col 54}{space 3}0.000{col 62}{space 4} 3.703206{col 75}{space 3} 5.732491
{txt}{space 11}d_dist172 {c |}{col 22}{res}{space 2} 21.55955{col 34}{space 2} 1.142046{col 45}{space 1}   18.88{col 54}{space 3}0.000{col 62}{space 4} 19.31167{col 75}{space 3} 23.80743
{txt}{space 11}d_dist173 {c |}{col 22}{res}{space 2} 7.733959{col 34}{space 2}  1.70986{col 45}{space 1}    4.52{col 54}{space 3}0.000{col 62}{space 4} 4.368454{col 75}{space 3} 11.09947
{txt}{space 11}d_dist174 {c |}{col 22}{res}{space 2} 16.61604{col 34}{space 2} 1.340863{col 45}{space 1}   12.39{col 54}{space 3}0.000{col 62}{space 4} 13.97683{col 75}{space 3} 19.25525
{txt}{space 11}d_dist175 {c |}{col 22}{res}{space 2} 15.17653{col 34}{space 2} 1.320725{col 45}{space 1}   11.49{col 54}{space 3}0.000{col 62}{space 4} 12.57695{col 75}{space 3}  17.7761
{txt}{space 11}d_dist176 {c |}{col 22}{res}{space 2} 12.94496{col 34}{space 2} 1.255935{col 45}{space 1}   10.31{col 54}{space 3}0.000{col 62}{space 4} 10.47291{col 75}{space 3} 15.41701
{txt}{space 11}d_dist177 {c |}{col 22}{res}{space 2}  28.6969{col 34}{space 2} 1.181403{col 45}{space 1}   24.29{col 54}{space 3}0.000{col 62}{space 4} 26.37155{col 75}{space 3} 31.02225
{txt}{space 11}d_dist178 {c |}{col 22}{res}{space 2} 48.64797{col 34}{space 2} 1.199781{col 45}{space 1}   40.55{col 54}{space 3}0.000{col 62}{space 4} 46.28645{col 75}{space 3}  51.0095
{txt}{space 11}d_dist179 {c |}{col 22}{res}{space 2} 35.19711{col 34}{space 2} 1.329731{col 45}{space 1}   26.47{col 54}{space 3}0.000{col 62}{space 4} 32.57981{col 75}{space 3} 37.81442
{txt}{space 11}d_dist180 {c |}{col 22}{res}{space 2} 32.64283{col 34}{space 2} 1.158413{col 45}{space 1}   28.18{col 54}{space 3}0.000{col 62}{space 4} 30.36273{col 75}{space 3} 34.92293
{txt}{space 11}d_dist181 {c |}{col 22}{res}{space 2} 34.73437{col 34}{space 2} 1.201063{col 45}{space 1}   28.92{col 54}{space 3}0.000{col 62}{space 4} 32.37033{col 75}{space 3} 37.09842
{txt}{space 11}d_dist182 {c |}{col 22}{res}{space 2} 45.36878{col 34}{space 2} 1.163588{col 45}{space 1}   38.99{col 54}{space 3}0.000{col 62}{space 4} 43.07849{col 75}{space 3} 47.65906
{txt}{space 11}d_dist183 {c |}{col 22}{res}{space 2} 47.36342{col 34}{space 2} 1.860083{col 45}{space 1}   25.46{col 54}{space 3}0.000{col 62}{space 4} 43.70223{col 75}{space 3} 51.02461
{txt}{space 11}d_dist184 {c |}{col 22}{res}{space 2} 43.55373{col 34}{space 2}  1.17041{col 45}{space 1}   37.21{col 54}{space 3}0.000{col 62}{space 4} 41.25002{col 75}{space 3} 45.85744
{txt}{space 11}d_dist185 {c |}{col 22}{res}{space 2} 7.270932{col 34}{space 2} 1.349725{col 45}{space 1}    5.39{col 54}{space 3}0.000{col 62}{space 4} 4.614277{col 75}{space 3} 9.927586
{txt}{space 11}d_dist186 {c |}{col 22}{res}{space 2} 33.41967{col 34}{space 2}  1.43531{col 45}{space 1}   23.28{col 54}{space 3}0.000{col 62}{space 4} 30.59456{col 75}{space 3} 36.24478
{txt}{space 11}d_dist187 {c |}{col 22}{res}{space 2} 44.41467{col 34}{space 2}  1.43531{col 45}{space 1}   30.94{col 54}{space 3}0.000{col 62}{space 4} 41.58956{col 75}{space 3} 47.23978
{txt}{space 11}d_dist188 {c |}{col 22}{res}{space 2} 48.27967{col 34}{space 2}  1.43531{col 45}{space 1}   33.64{col 54}{space 3}0.000{col 62}{space 4} 45.45456{col 75}{space 3} 51.10478
{txt}{space 11}d_dist189 {c |}{col 22}{res}{space 2} 29.96996{col 34}{space 2} 1.336602{col 45}{space 1}   22.42{col 54}{space 3}0.000{col 62}{space 4} 27.33913{col 75}{space 3} 32.60078
{txt}{space 11}d_dist190 {c |}{col 22}{res}{space 2} 20.07782{col 34}{space 2} 1.256169{col 45}{space 1}   15.98{col 54}{space 3}0.000{col 62}{space 4} 17.60531{col 75}{space 3} 22.55033
{txt}{space 11}d_dist191 {c |}{col 22}{res}{space 2} 7.579316{col 34}{space 2} 1.210989{col 45}{space 1}    6.26{col 54}{space 3}0.000{col 62}{space 4} 5.195735{col 75}{space 3} 9.962897
{txt}{space 11}d_dist192 {c |}{col 22}{res}{space 2} 5.280927{col 34}{space 2} 1.346776{col 45}{space 1}    3.92{col 54}{space 3}0.000{col 62}{space 4} 2.630078{col 75}{space 3} 7.931777
{txt}{space 11}d_dist193 {c |}{col 22}{res}{space 2}  21.7788{col 34}{space 2} 1.330694{col 45}{space 1}   16.37{col 54}{space 3}0.000{col 62}{space 4}  19.1596{col 75}{space 3} 24.39799
{txt}{space 11}d_dist194 {c |}{col 22}{res}{space 2} 23.94565{col 34}{space 2} 1.301762{col 45}{space 1}   18.39{col 54}{space 3}0.000{col 62}{space 4}  21.3834{col 75}{space 3}  26.5079
{txt}{space 11}d_dist195 {c |}{col 22}{res}{space 2} 15.48138{col 34}{space 2} 1.954033{col 45}{space 1}    7.92{col 54}{space 3}0.000{col 62}{space 4} 11.63527{col 75}{space 3} 19.32749
{txt}{space 11}d_dist196 {c |}{col 22}{res}{space 2} 7.089106{col 34}{space 2} 1.869469{col 45}{space 1}    3.79{col 54}{space 3}0.000{col 62}{space 4} 3.409443{col 75}{space 3} 10.76877
{txt}{space 11}d_dist197 {c |}{col 22}{res}{space 2} 19.10248{col 34}{space 2} 1.349532{col 45}{space 1}   14.15{col 54}{space 3}0.000{col 62}{space 4} 16.44621{col 75}{space 3} 21.75876
{txt}{space 11}d_dist198 {c |}{col 22}{res}{space 2} 2.833533{col 34}{space 2} 1.182873{col 45}{space 1}    2.40{col 54}{space 3}0.017{col 62}{space 4} .5052914{col 75}{space 3} 5.161775
{txt}{space 11}d_dist199 {c |}{col 22}{res}{space 2} 24.45322{col 34}{space 2}  1.19813{col 45}{space 1}   20.41{col 54}{space 3}0.000{col 62}{space 4} 22.09495{col 75}{space 3}  26.8115
{txt}{space 11}d_dist200 {c |}{col 22}{res}{space 2} 23.74352{col 34}{space 2} 1.621329{col 45}{space 1}   14.64{col 54}{space 3}0.000{col 62}{space 4} 20.55227{col 75}{space 3} 26.93477
{txt}{space 11}d_dist201 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist202 {c |}{col 22}{res}{space 2} 9.662508{col 34}{space 2} .4793649{col 45}{space 1}   20.16{col 54}{space 3}0.000{col 62}{space 4} 8.718977{col 75}{space 3} 10.60604
{txt}{space 11}d_dist203 {c |}{col 22}{res}{space 2}-1.971228{col 34}{space 2}  .486708{col 45}{space 1}   -4.05{col 54}{space 3}0.000{col 62}{space 4}-2.929212{col 75}{space 3}-1.013244
{txt}{space 11}d_dist204 {c |}{col 22}{res}{space 2} 5.522433{col 34}{space 2} .8234619{col 45}{space 1}    6.71{col 54}{space 3}0.000{col 62}{space 4} 3.901618{col 75}{space 3} 7.143247
{txt}{space 11}d_dist205 {c |}{col 22}{res}{space 2}-1.186426{col 34}{space 2} .4983056{col 45}{space 1}   -2.38{col 54}{space 3}0.018{col 62}{space 4}-2.167237{col 75}{space 3}-.2056143
{txt}{space 11}d_dist206 {c |}{col 22}{res}{space 2}-3.073845{col 34}{space 2} .0498204{col 45}{space 1}  -61.70{col 54}{space 3}0.000{col 62}{space 4}-3.171906{col 75}{space 3}-2.975784
{txt}{space 11}d_dist207 {c |}{col 22}{res}{space 2} 7.961698{col 34}{space 2} .4966218{col 45}{space 1}   16.03{col 54}{space 3}0.000{col 62}{space 4}   6.9842{col 75}{space 3} 8.939195
{txt}{space 11}d_dist208 {c |}{col 22}{res}{space 2} 3.403188{col 34}{space 2} .4785877{col 45}{space 1}    7.11{col 54}{space 3}0.000{col 62}{space 4} 2.461187{col 75}{space 3} 4.345188
{txt}{space 11}d_dist209 {c |}{col 22}{res}{space 2}-12.33871{col 34}{space 2} .4853895{col 45}{space 1}  -25.42{col 54}{space 3}0.000{col 62}{space 4} -13.2941{col 75}{space 3}-11.38332
{txt}{space 11}d_dist210 {c |}{col 22}{res}{space 2} 3.721074{col 34}{space 2} .4983056{col 45}{space 1}    7.47{col 54}{space 3}0.000{col 62}{space 4} 2.740263{col 75}{space 3} 4.701886
{txt}{space 11}d_dist211 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist212 {c |}{col 22}{res}{space 2}-9.265545{col 34}{space 2} .6040188{col 45}{space 1}  -15.34{col 54}{space 3}0.000{col 62}{space 4}-10.45443{col 75}{space 3}-8.076659
{txt}{space 11}d_dist213 {c |}{col 22}{res}{space 2} 4.051302{col 34}{space 2} .4946341{col 45}{space 1}    8.19{col 54}{space 3}0.000{col 62}{space 4} 3.077717{col 75}{space 3} 5.024887
{txt}{space 11}d_dist214 {c |}{col 22}{res}{space 2}-2.606948{col 34}{space 2} .4952682{col 45}{space 1}   -5.26{col 54}{space 3}0.000{col 62}{space 4}-3.581781{col 75}{space 3}-1.632115
{txt}{space 11}d_dist215 {c |}{col 22}{res}{space 2} 3.011991{col 34}{space 2} 1.198163{col 45}{space 1}    2.51{col 54}{space 3}0.012{col 62}{space 4} .6536549{col 75}{space 3} 5.370327
{txt}{space 11}d_dist216 {c |}{col 22}{res}{space 2} 12.66575{col 34}{space 2}  1.36868{col 45}{space 1}    9.25{col 54}{space 3}0.000{col 62}{space 4} 9.971788{col 75}{space 3} 15.35972
{txt}{space 11}d_dist217 {c |}{col 22}{res}{space 2} 12.44427{col 34}{space 2} .5882429{col 45}{space 1}   21.15{col 54}{space 3}0.000{col 62}{space 4} 11.28643{col 75}{space 3}  13.6021
{txt}{space 11}d_dist218 {c |}{col 22}{res}{space 2} 14.50795{col 34}{space 2} .6971156{col 45}{space 1}   20.81{col 54}{space 3}0.000{col 62}{space 4} 13.13582{col 75}{space 3} 15.88008
{txt}{space 11}d_dist219 {c |}{col 22}{res}{space 2} 13.87399{col 34}{space 2} .4601788{col 45}{space 1}   30.15{col 54}{space 3}0.000{col 62}{space 4} 12.96823{col 75}{space 3} 14.77976
{txt}{space 11}d_dist220 {c |}{col 22}{res}{space 2} 20.65903{col 34}{space 2} 1.412904{col 45}{space 1}   14.62{col 54}{space 3}0.000{col 62}{space 4} 17.87802{col 75}{space 3} 23.44004
{txt}{space 11}d_dist221 {c |}{col 22}{res}{space 2} 12.82125{col 34}{space 2} .2469421{col 45}{space 1}   51.92{col 54}{space 3}0.000{col 62}{space 4}  12.3352{col 75}{space 3} 13.30731
{txt}{space 11}d_dist222 {c |}{col 22}{res}{space 2} 16.29397{col 34}{space 2} .4003293{col 45}{space 1}   40.70{col 54}{space 3}0.000{col 62}{space 4} 15.50601{col 75}{space 3} 17.08194
{txt}{space 11}d_dist223 {c |}{col 22}{res}{space 2} 17.55589{col 34}{space 2} .6323733{col 45}{space 1}   27.76{col 54}{space 3}0.000{col 62}{space 4}  16.3112{col 75}{space 3} 18.80059
{txt}{space 11}d_dist224 {c |}{col 22}{res}{space 2} 10.29947{col 34}{space 2}  .419362{col 45}{space 1}   24.56{col 54}{space 3}0.000{col 62}{space 4}  9.47404{col 75}{space 3} 11.12489
{txt}{space 11}d_dist225 {c |}{col 22}{res}{space 2} 37.63634{col 34}{space 2}  .025942{col 45}{space 1} 1450.79{col 54}{space 3}0.000{col 62}{space 4} 37.58527{col 75}{space 3}  37.6874
{txt}{space 11}d_dist226 {c |}{col 22}{res}{space 2}  7.59822{col 34}{space 2} .4791905{col 45}{space 1}   15.86{col 54}{space 3}0.000{col 62}{space 4} 6.655033{col 75}{space 3} 8.541408
{txt}{space 11}d_dist227 {c |}{col 22}{res}{space 2} 11.64584{col 34}{space 2} .6962905{col 45}{space 1}   16.73{col 54}{space 3}0.000{col 62}{space 4} 10.27533{col 75}{space 3} 13.01634
{txt}{space 11}d_dist228 {c |}{col 22}{res}{space 2} 11.60216{col 34}{space 2} .4182447{col 45}{space 1}   27.74{col 54}{space 3}0.000{col 62}{space 4} 10.77893{col 75}{space 3} 12.42539
{txt}{space 11}d_dist229 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist230 {c |}{col 22}{res}{space 2} 5.382978{col 34}{space 2} .2581658{col 45}{space 1}   20.85{col 54}{space 3}0.000{col 62}{space 4} 4.874832{col 75}{space 3} 5.891124
{txt}{space 11}d_dist231 {c |}{col 22}{res}{space 2} 24.57166{col 34}{space 2} .8651587{col 45}{space 1}   28.40{col 54}{space 3}0.000{col 62}{space 4} 22.86877{col 75}{space 3} 26.27454
{txt}{space 11}d_dist232 {c |}{col 22}{res}{space 2} 5.882435{col 34}{space 2} 1.241884{col 45}{space 1}    4.74{col 54}{space 3}0.000{col 62}{space 4} 3.438043{col 75}{space 3} 8.326828
{txt}{space 11}d_dist233 {c |}{col 22}{res}{space 2} 4.405215{col 34}{space 2} 3.237167{col 45}{space 1}    1.36{col 54}{space 3}0.175{col 62}{space 4}-1.966479{col 75}{space 3} 10.77691
{txt}{space 11}d_dist234 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist235 {c |}{col 22}{res}{space 2} 11.18273{col 34}{space 2} 4.597432{col 45}{space 1}    2.43{col 54}{space 3}0.016{col 62}{space 4} 2.133637{col 75}{space 3} 20.23182
{txt}{space 11}d_dist236 {c |}{col 22}{res}{space 2} 14.05956{col 34}{space 2}  3.42003{col 45}{space 1}    4.11{col 54}{space 3}0.000{col 62}{space 4} 7.327941{col 75}{space 3} 20.79119
{txt}{space 11}d_dist237 {c |}{col 22}{res}{space 2}-3.900322{col 34}{space 2} 7.731852{col 45}{space 1}   -0.50{col 54}{space 3}0.614{col 62}{space 4}-19.11887{col 75}{space 3} 11.31823
{txt}{space 11}d_dist238 {c |}{col 22}{res}{space 2}-4.144402{col 34}{space 2} 3.372421{col 45}{space 1}   -1.23{col 54}{space 3}0.220{col 62}{space 4}-10.78232{col 75}{space 3} 2.493512
{txt}{space 11}d_dist239 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist240 {c |}{col 22}{res}{space 2} .8277732{col 34}{space 2} 3.467336{col 45}{space 1}    0.24{col 54}{space 3}0.811{col 62}{space 4} -5.99696{col 75}{space 3} 7.652506
{txt}{space 11}d_dist241 {c |}{col 22}{res}{space 2}-4.682129{col 34}{space 2} 3.379023{col 45}{space 1}   -1.39{col 54}{space 3}0.167{col 62}{space 4}-11.33304{col 75}{space 3}  1.96878
{txt}{space 11}d_dist242 {c |}{col 22}{res}{space 2}-15.33214{col 34}{space 2} 4.084451{col 45}{space 1}   -3.75{col 54}{space 3}0.000{col 62}{space 4}-23.37154{col 75}{space 3}-7.292747
{txt}{space 11}d_dist243 {c |}{col 22}{res}{space 2} 18.20921{col 34}{space 2} .6445855{col 45}{space 1}   28.25{col 54}{space 3}0.000{col 62}{space 4} 16.94047{col 75}{space 3} 19.47794
{txt}{space 11}d_dist244 {c |}{col 22}{res}{space 2} 13.28618{col 34}{space 2} .7873873{col 45}{space 1}   16.87{col 54}{space 3}0.000{col 62}{space 4} 11.73637{col 75}{space 3} 14.83599
{txt}{space 11}d_dist245 {c |}{col 22}{res}{space 2}-24.15395{col 34}{space 2} .6261144{col 45}{space 1}  -38.58{col 54}{space 3}0.000{col 62}{space 4}-25.38632{col 75}{space 3}-22.92157
{txt}{space 11}d_dist246 {c |}{col 22}{res}{space 2}-21.42204{col 34}{space 2} .6946732{col 45}{space 1}  -30.84{col 54}{space 3}0.000{col 62}{space 4}-22.78936{col 75}{space 3}-20.05472
{txt}{space 11}d_dist247 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist248 {c |}{col 22}{res}{space 2}-23.60323{col 34}{space 2} .5972663{col 45}{space 1}  -39.52{col 54}{space 3}0.000{col 62}{space 4}-24.77883{col 75}{space 3}-22.42764
{txt}{space 11}d_dist249 {c |}{col 22}{res}{space 2} -23.8182{col 34}{space 2} .9836775{col 45}{space 1}  -24.21{col 54}{space 3}0.000{col 62}{space 4}-25.75436{col 75}{space 3}-21.88203
{txt}{space 11}d_dist250 {c |}{col 22}{res}{space 2}-19.64665{col 34}{space 2} 1.980234{col 45}{space 1}   -9.92{col 54}{space 3}0.000{col 62}{space 4}-23.54433{col 75}{space 3}-15.74897
{txt}{space 11}d_dist251 {c |}{col 22}{res}{space 2}-9.300232{col 34}{space 2} .7717413{col 45}{space 1}  -12.05{col 54}{space 3}0.000{col 62}{space 4}-10.81924{col 75}{space 3}-7.781219
{txt}{space 11}d_dist252 {c |}{col 22}{res}{space 2}-13.97956{col 34}{space 2} .6640833{col 45}{space 1}  -21.05{col 54}{space 3}0.000{col 62}{space 4}-15.28667{col 75}{space 3}-12.67245
{txt}{space 11}d_dist253 {c |}{col 22}{res}{space 2}-8.851703{col 34}{space 2} .6032355{col 45}{space 1}  -14.67{col 54}{space 3}0.000{col 62}{space 4}-10.03905{col 75}{space 3}-7.664358
{txt}{space 11}d_dist254 {c |}{col 22}{res}{space 2}-8.790227{col 34}{space 2} .6283367{col 45}{space 1}  -13.99{col 54}{space 3}0.000{col 62}{space 4}-10.02698{col 75}{space 3}-7.553477
{txt}{space 11}d_dist255 {c |}{col 22}{res}{space 2}-10.13562{col 34}{space 2} 1.934215{col 45}{space 1}   -5.24{col 54}{space 3}0.000{col 62}{space 4}-13.94272{col 75}{space 3} -6.32852
{txt}{space 11}d_dist256 {c |}{col 22}{res}{space 2} 16.59531{col 34}{space 2} .6366308{col 45}{space 1}   26.07{col 54}{space 3}0.000{col 62}{space 4} 15.34224{col 75}{space 3} 17.84839
{txt}{space 11}d_dist257 {c |}{col 22}{res}{space 2}-15.37365{col 34}{space 2} 1.915338{col 45}{space 1}   -8.03{col 54}{space 3}0.000{col 62}{space 4} -19.1436{col 75}{space 3}-11.60371
{txt}{space 11}d_dist258 {c |}{col 22}{res}{space 2}-14.68646{col 34}{space 2}  .780847{col 45}{space 1}  -18.81{col 54}{space 3}0.000{col 62}{space 4} -16.2234{col 75}{space 3}-13.14953
{txt}{space 11}d_dist259 {c |}{col 22}{res}{space 2}-15.28572{col 34}{space 2} .6054829{col 45}{space 1}  -25.25{col 54}{space 3}0.000{col 62}{space 4}-16.47749{col 75}{space 3}-14.09395
{txt}{space 11}d_dist260 {c |}{col 22}{res}{space 2}-13.12128{col 34}{space 2}  .645605{col 45}{space 1}  -20.32{col 54}{space 3}0.000{col 62}{space 4}-14.39202{col 75}{space 3}-11.85054
{txt}{space 11}d_dist261 {c |}{col 22}{res}{space 2} .3719293{col 34}{space 2} .6997074{col 45}{space 1}    0.53{col 54}{space 3}0.595{col 62}{space 4}  -1.0053{col 75}{space 3} 1.749159
{txt}{space 11}d_dist262 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist263 {c |}{col 22}{res}{space 2}-1.370946{col 34}{space 2} 2.909961{col 45}{space 1}   -0.47{col 54}{space 3}0.638{col 62}{space 4}-7.098604{col 75}{space 3} 4.356711
{txt}{space 11}d_dist264 {c |}{col 22}{res}{space 2}-15.51563{col 34}{space 2} 4.000228{col 45}{space 1}   -3.88{col 54}{space 3}0.000{col 62}{space 4}-23.38925{col 75}{space 3}-7.642007
{txt}{space 11}d_dist265 {c |}{col 22}{res}{space 2}-25.83227{col 34}{space 2} 2.909835{col 45}{space 1}   -8.88{col 54}{space 3}0.000{col 62}{space 4}-31.55968{col 75}{space 3}-20.10486
{txt}{space 11}d_dist266 {c |}{col 22}{res}{space 2}-15.23846{col 34}{space 2} 2.910544{col 45}{space 1}   -5.24{col 54}{space 3}0.000{col 62}{space 4}-20.96726{col 75}{space 3}-9.509654
{txt}{space 11}d_dist267 {c |}{col 22}{res}{space 2}-5.563559{col 34}{space 2} 3.998455{col 45}{space 1}   -1.39{col 54}{space 3}0.165{col 62}{space 4}-13.43369{col 75}{space 3} 2.306572
{txt}{space 11}d_dist268 {c |}{col 22}{res}{space 2} -4.00346{col 34}{space 2} 2.910544{col 45}{space 1}   -1.38{col 54}{space 3}0.170{col 62}{space 4}-9.732264{col 75}{space 3} 1.725344
{txt}{space 11}d_dist269 {c |}{col 22}{res}{space 2}-.9930126{col 34}{space 2}  3.99818{col 45}{space 1}   -0.25{col 54}{space 3}0.804{col 62}{space 4}-8.862604{col 75}{space 3} 6.876578
{txt}{space 11}d_dist270 {c |}{col 22}{res}{space 2} 3.266145{col 34}{space 2} 2.425789{col 45}{space 1}    1.35{col 54}{space 3}0.179{col 62}{space 4}-1.508519{col 75}{space 3}  8.04081
{txt}{space 11}d_dist271 {c |}{col 22}{res}{space 2} 1.763095{col 34}{space 2} 1.560374{col 45}{space 1}    1.13{col 54}{space 3}0.259{col 62}{space 4}-1.308178{col 75}{space 3} 4.834368
{txt}{space 11}d_dist272 {c |}{col 22}{res}{space 2}-2.122804{col 34}{space 2} 1.557591{col 45}{space 1}   -1.36{col 54}{space 3}0.174{col 62}{space 4}-5.188599{col 75}{space 3} .9429918
{txt}{space 11}d_dist273 {c |}{col 22}{res}{space 2}-.2889654{col 34}{space 2} 2.099178{col 45}{space 1}   -0.14{col 54}{space 3}0.891{col 62}{space 4}-4.420763{col 75}{space 3} 3.842833
{txt}{space 11}d_dist274 {c |}{col 22}{res}{space 2} 1.939772{col 34}{space 2} 1.321124{col 45}{space 1}    1.47{col 54}{space 3}0.143{col 62}{space 4}-.6605867{col 75}{space 3} 4.540132
{txt}{space 11}d_dist275 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 11}d_dist276 {c |}{col 22}{res}{space 2}  3.31196{col 34}{space 2} 1.528934{col 45}{space 1}    2.17{col 54}{space 3}0.031{col 62}{space 4}   .30257{col 75}{space 3}  6.32135
{txt}{space 11}d_dist277 {c |}{col 22}{res}{space 2} 24.25696{col 34}{space 2}  1.51707{col 45}{space 1}   15.99{col 54}{space 3}0.000{col 62}{space 4} 21.27093{col 75}{space 3}   27.243
{txt}{space 11}d_dist278 {c |}{col 22}{res}{space 2}-11.20113{col 34}{space 2} 1.806003{col 45}{space 1}   -6.20{col 54}{space 3}0.000{col 62}{space 4}-14.75587{col 75}{space 3}-7.646386
{txt}{space 11}d_dist279 {c |}{col 22}{res}{space 2} .3466661{col 34}{space 2} 1.567288{col 45}{space 1}    0.22{col 54}{space 3}0.825{col 62}{space 4}-2.738217{col 75}{space 3} 3.431549
{txt}{space 11}d_dist280 {c |}{col 22}{res}{space 2} 5.903229{col 34}{space 2}  3.00504{col 45}{space 1}    1.96{col 54}{space 3}0.050{col 62}{space 4}-.0115708{col 75}{space 3} 11.81803
{txt}{space 11}d_dist281 {c |}{col 22}{res}{space 2} 4.430993{col 34}{space 2} 2.969689{col 45}{space 1}    1.49{col 54}{space 3}0.137{col 62}{space 4}-1.414225{col 75}{space 3} 10.27621
{txt}{space 11}d_dist282 {c |}{col 22}{res}{space 2} .0949557{col 34}{space 2} 2.881989{col 45}{space 1}    0.03{col 54}{space 3}0.974{col 62}{space 4}-5.577645{col 75}{space 3} 5.767556
{txt}{space 11}d_dist283 {c |}{col 22}{res}{space 2} 21.64158{col 34}{space 2} 4.685514{col 45}{space 1}    4.62{col 54}{space 3}0.000{col 62}{space 4} 12.41911{col 75}{space 3} 30.86404
{txt}{space 11}d_dist284 {c |}{col 22}{res}{space 2} 15.71727{col 34}{space 2} 2.988969{col 45}{space 1}    5.26{col 54}{space 3}0.000{col 62}{space 4} 9.834106{col 75}{space 3} 21.60044
{txt}{space 11}d_dist285 {c |}{col 22}{res}{space 2} 16.56728{col 34}{space 2} 2.884896{col 45}{space 1}    5.74{col 54}{space 3}0.000{col 62}{space 4} 10.88896{col 75}{space 3}  22.2456
{txt}{space 11}d_dist286 {c |}{col 22}{res}{space 2} 13.59847{col 34}{space 2} 3.220666{col 45}{space 1}    4.22{col 54}{space 3}0.000{col 62}{space 4} 7.259256{col 75}{space 3} 19.93769
{txt}{space 11}d_dist287 {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (omitted)
{space 15}inter {c |}{col 22}{res}{space 2} .3169816{col 34}{space 2} .4240608{col 45}{space 1}    0.75{col 54}{space 3}0.455{col 62}{space 4}-.5176945{col 75}{space 3} 1.151658
{txt}cum_capacity_turbine {c |}{col 22}{res}{space 2}-.0026794{col 34}{space 2} .0036161{col 45}{space 1}   -0.74{col 54}{space 3}0.459{col 62}{space 4}-.0097969{col 75}{space 3} .0044381
{txt}{space 15}_cons {c |}{col 22}{res}{space 2} 98.55052{col 34}{space 2} 7.579163{col 45}{space 1}   13.00{col 54}{space 3}0.000{col 62}{space 4}  83.6325{col 75}{space 3} 113.4685
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{res}{txt}note: d_sy16 omitted because of collinearity
note: d_sy18 omitted because of collinearity
note: d_sy32 omitted because of collinearity
note: d_sy60 omitted because of collinearity
note: d_dist8 omitted because of collinearity
note: d_dist12 omitted because of collinearity
note: d_dist68 omitted because of collinearity
note: d_dist77 omitted because of collinearity
note: d_dist99 omitted because of collinearity
note: d_dist101 omitted because of collinearity
note: d_dist107 omitted because of collinearity
note: d_dist122 omitted because of collinearity
note: d_dist129 omitted because of collinearity
note: d_dist140 omitted because of collinearity
note: d_dist152 omitted because of collinearity
note: d_dist156 omitted because of collinearity
note: d_dist166 omitted because of collinearity
note: d_dist201 omitted because of collinearity
note: d_dist206 omitted because of collinearity
note: d_dist229 omitted because of collinearity
note: d_dist234 omitted because of collinearity
note: d_dist239 omitted because of collinearity
note: d_dist247 omitted because of collinearity
note: d_dist262 omitted because of collinearity
note: d_dist275 omitted because of collinearity
note: d_dist287 omitted because of collinearity

Linear regression                               Number of obs     = {res}     1,046
                                                {txt}{help j_robustsingular:F(67, 286) }       =  {res}        .
                                                {txt}Prob > F          = {res}         .
                                                {txt}R-squared         = {res}    0.7385
                                                {txt}Root MSE          =    {res} 8.8346

{txt}{ralign 83:(Std. Err. adjusted for {res:287} clusters in district_fixed)}
{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}incumbvotesmajo~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 12}d_sy1 {c |}{col 19}{res}{space 2}-33.78886{col 31}{space 2} 8.545107{col 42}{space 1}   -3.95{col 51}{space 3}0.000{col 59}{space 4}-50.60813{col 72}{space 3}-16.96958
{txt}{space 12}d_sy2 {c |}{col 19}{res}{space 2}-42.83395{col 31}{space 2} 7.568409{col 42}{space 1}   -5.66{col 51}{space 3}0.000{col 59}{space 4} -57.7308{col 72}{space 3}-27.93711
{txt}{space 12}d_sy3 {c |}{col 19}{res}{space 2}-47.85415{col 31}{space 2} 6.158481{col 42}{space 1}   -7.77{col 51}{space 3}0.000{col 59}{space 4}-59.97585{col 72}{space 3}-35.73246
{txt}{space 12}d_sy4 {c |}{col 19}{res}{space 2}-50.89809{col 31}{space 2} 4.423415{col 42}{space 1}  -11.51{col 51}{space 3}0.000{col 59}{space 4}-59.60467{col 72}{space 3}-42.19151
{txt}{space 12}d_sy5 {c |}{col 19}{res}{space 2} -40.7861{col 31}{space 2} 7.442859{col 42}{space 1}   -5.48{col 51}{space 3}0.000{col 59}{space 4}-55.43583{col 72}{space 3}-26.13637
{txt}{space 12}d_sy6 {c |}{col 19}{res}{space 2}-40.86176{col 31}{space 2} 6.526248{col 42}{space 1}   -6.26{col 51}{space 3}0.000{col 59}{space 4}-53.70732{col 72}{space 3}-28.01619
{txt}{space 12}d_sy7 {c |}{col 19}{res}{space 2}-41.18935{col 31}{space 2} 5.687893{col 42}{space 1}   -7.24{col 51}{space 3}0.000{col 59}{space 4}-52.38479{col 72}{space 3}-29.99391
{txt}{space 12}d_sy8 {c |}{col 19}{res}{space 2}-48.33903{col 31}{space 2}  4.07919{col 42}{space 1}  -11.85{col 51}{space 3}0.000{col 59}{space 4}-56.36807{col 72}{space 3}-40.30999
{txt}{space 12}d_sy9 {c |}{col 19}{res}{space 2}-38.68414{col 31}{space 2} 7.703842{col 42}{space 1}   -5.02{col 51}{space 3}0.000{col 59}{space 4}-53.84756{col 72}{space 3}-23.52072
{txt}{space 11}d_sy10 {c |}{col 19}{res}{space 2}-33.96079{col 31}{space 2} 8.324837{col 42}{space 1}   -4.08{col 51}{space 3}0.000{col 59}{space 4}-50.34651{col 72}{space 3}-17.57507
{txt}{space 11}d_sy11 {c |}{col 19}{res}{space 2}-42.84432{col 31}{space 2} 4.832632{col 42}{space 1}   -8.87{col 51}{space 3}0.000{col 59}{space 4}-52.35636{col 72}{space 3}-33.33229
{txt}{space 11}d_sy12 {c |}{col 19}{res}{space 2}-46.30063{col 31}{space 2} 3.147665{col 42}{space 1}  -14.71{col 51}{space 3}0.000{col 59}{space 4}-52.49616{col 72}{space 3} -40.1051
{txt}{space 11}d_sy13 {c |}{col 19}{res}{space 2}-7.991131{col 31}{space 2} 4.381379{col 42}{space 1}   -1.82{col 51}{space 3}0.069{col 59}{space 4}-16.61497{col 72}{space 3} .6327077
{txt}{space 11}d_sy14 {c |}{col 19}{res}{space 2} -3.56342{col 31}{space 2} 3.069703{col 42}{space 1}   -1.16{col 51}{space 3}0.247{col 59}{space 4}-9.605497{col 72}{space 3} 2.478656
{txt}{space 11}d_sy15 {c |}{col 19}{res}{space 2} 6.011704{col 31}{space 2} 1.488757{col 42}{space 1}    4.04{col 51}{space 3}0.000{col 59}{space 4} 3.081393{col 72}{space 3} 8.942015
{txt}{space 11}d_sy16 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 11}d_sy17 {c |}{col 19}{res}{space 2} 15.58534{col 31}{space 2} 7.270146{col 42}{space 1}    2.14{col 51}{space 3}0.033{col 59}{space 4} 1.275565{col 72}{space 3} 29.89512
{txt}{space 11}d_sy18 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 11}d_sy19 {c |}{col 19}{res}{space 2} 3.511181{col 31}{space 2} 2.357234{col 42}{space 1}    1.49{col 51}{space 3}0.137{col 59}{space 4}-1.128546{col 72}{space 3} 8.150908
{txt}{space 11}d_sy20 {c |}{col 19}{res}{space 2} 1.806252{col 31}{space 2} 6.070625{col 42}{space 1}    0.30{col 51}{space 3}0.766{col 59}{space 4}-10.14252{col 72}{space 3} 13.75502
{txt}{space 11}d_sy21 {c |}{col 19}{res}{space 2}-21.15755{col 31}{space 2} 7.723888{col 42}{space 1}   -2.74{col 51}{space 3}0.007{col 59}{space 4}-36.36043{col 72}{space 3}-5.954675
{txt}{space 11}d_sy22 {c |}{col 19}{res}{space 2}-23.17065{col 31}{space 2} 6.233921{col 42}{space 1}   -3.72{col 51}{space 3}0.000{col 59}{space 4}-35.44083{col 72}{space 3}-10.90046
{txt}{space 11}d_sy23 {c |}{col 19}{res}{space 2}-23.25082{col 31}{space 2} 5.427991{col 42}{space 1}   -4.28{col 51}{space 3}0.000{col 59}{space 4} -33.9347{col 72}{space 3}-12.56694
{txt}{space 11}d_sy24 {c |}{col 19}{res}{space 2}-29.97233{col 31}{space 2} 3.094455{col 42}{space 1}   -9.69{col 51}{space 3}0.000{col 59}{space 4}-36.06313{col 72}{space 3}-23.88154
{txt}{space 11}d_sy25 {c |}{col 19}{res}{space 2} -44.1695{col 31}{space 2} 8.018242{col 42}{space 1}   -5.51{col 51}{space 3}0.000{col 59}{space 4}-59.95176{col 72}{space 3}-28.38725
{txt}{space 11}d_sy26 {c |}{col 19}{res}{space 2} -52.5352{col 31}{space 2} 6.302229{col 42}{space 1}   -8.34{col 51}{space 3}0.000{col 59}{space 4}-64.93983{col 72}{space 3}-40.13056
{txt}{space 11}d_sy27 {c |}{col 19}{res}{space 2}-45.31354{col 31}{space 2} 5.021527{col 42}{space 1}   -9.02{col 51}{space 3}0.000{col 59}{space 4}-55.19738{col 72}{space 3} -35.4297
{txt}{space 11}d_sy28 {c |}{col 19}{res}{space 2}-52.33735{col 31}{space 2} 3.684627{col 42}{space 1}  -14.20{col 51}{space 3}0.000{col 59}{space 4}-59.58977{col 72}{space 3}-45.08492
{txt}{space 11}d_sy29 {c |}{col 19}{res}{space 2}-5.906612{col 31}{space 2} 7.773086{col 42}{space 1}   -0.76{col 51}{space 3}0.448{col 59}{space 4}-21.20632{col 72}{space 3}   9.3931
{txt}{space 11}d_sy30 {c |}{col 19}{res}{space 2}-13.33307{col 31}{space 2} 5.497835{col 42}{space 1}   -2.43{col 51}{space 3}0.016{col 59}{space 4}-24.15442{col 72}{space 3}-2.511713
{txt}{space 11}d_sy31 {c |}{col 19}{res}{space 2}-15.08106{col 31}{space 2} 2.124757{col 42}{space 1}   -7.10{col 51}{space 3}0.000{col 59}{space 4} -19.2632{col 72}{space 3}-10.89891
{txt}{space 11}d_sy32 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 11}d_sy33 {c |}{col 19}{res}{space 2}-31.45125{col 31}{space 2}  7.92476{col 42}{space 1}   -3.97{col 51}{space 3}0.000{col 59}{space 4} -47.0495{col 72}{space 3}  -15.853
{txt}{space 11}d_sy34 {c |}{col 19}{res}{space 2}-25.81329{col 31}{space 2} 8.702534{col 42}{space 1}   -2.97{col 51}{space 3}0.003{col 59}{space 4}-42.94243{col 72}{space 3} -8.68415
{txt}{space 11}d_sy35 {c |}{col 19}{res}{space 2}-32.24909{col 31}{space 2} 5.333589{col 42}{space 1}   -6.05{col 51}{space 3}0.000{col 59}{space 4}-42.74716{col 72}{space 3}-21.75103
{txt}{space 11}d_sy36 {c |}{col 19}{res}{space 2}-39.76246{col 31}{space 2} 4.729759{col 42}{space 1}   -8.41{col 51}{space 3}0.000{col 59}{space 4}-49.07201{col 72}{space 3} -30.4529
{txt}{space 11}d_sy37 {c |}{col 19}{res}{space 2}-25.18861{col 31}{space 2} 7.782129{col 42}{space 1}   -3.24{col 51}{space 3}0.001{col 59}{space 4}-40.50612{col 72}{space 3}-9.871096
{txt}{space 11}d_sy38 {c |}{col 19}{res}{space 2}-19.84253{col 31}{space 2}  5.59041{col 42}{space 1}   -3.55{col 51}{space 3}0.000{col 59}{space 4} -30.8461{col 72}{space 3}-8.838968
{txt}{space 11}d_sy39 {c |}{col 19}{res}{space 2}-23.56691{col 31}{space 2} 5.988437{col 42}{space 1}   -3.94{col 51}{space 3}0.000{col 59}{space 4}-35.35391{col 72}{space 3}-11.77991
{txt}{space 11}d_sy40 {c |}{col 19}{res}{space 2}-49.72812{col 31}{space 2} 5.506816{col 42}{space 1}   -9.03{col 51}{space 3}0.000{col 59}{space 4}-60.56715{col 72}{space 3}-38.88909
{txt}{space 11}d_sy41 {c |}{col 19}{res}{space 2}-48.18986{col 31}{space 2} 7.598307{col 42}{space 1}   -6.34{col 51}{space 3}0.000{col 59}{space 4}-63.14555{col 72}{space 3}-33.23416
{txt}{space 11}d_sy42 {c |}{col 19}{res}{space 2}-47.71982{col 31}{space 2} 6.875647{col 42}{space 1}   -6.94{col 51}{space 3}0.000{col 59}{space 4}-61.25311{col 72}{space 3}-34.18653
{txt}{space 11}d_sy43 {c |}{col 19}{res}{space 2}-52.59981{col 31}{space 2} 4.444009{col 42}{space 1}  -11.84{col 51}{space 3}0.000{col 59}{space 4}-61.34692{col 72}{space 3} -43.8527
{txt}{space 11}d_sy44 {c |}{col 19}{res}{space 2}-56.13122{col 31}{space 2} 3.136188{col 42}{space 1}  -17.90{col 51}{space 3}0.000{col 59}{space 4}-62.30416{col 72}{space 3}-49.95828
{txt}{space 11}d_sy45 {c |}{col 19}{res}{space 2}-33.75223{col 31}{space 2}  7.88037{col 42}{space 1}   -4.28{col 51}{space 3}0.000{col 59}{space 4} -49.2631{col 72}{space 3}-18.24135
{txt}{space 11}d_sy46 {c |}{col 19}{res}{space 2} -36.1331{col 31}{space 2} 6.032194{col 42}{space 1}   -5.99{col 51}{space 3}0.000{col 59}{space 4}-48.00623{col 72}{space 3}-24.25998
{txt}{space 11}d_sy47 {c |}{col 19}{res}{space 2}-34.64166{col 31}{space 2} 4.408943{col 42}{space 1}   -7.86{col 51}{space 3}0.000{col 59}{space 4}-43.31975{col 72}{space 3}-25.96356
{txt}{space 11}d_sy48 {c |}{col 19}{res}{space 2}-41.98864{col 31}{space 2} 2.541671{col 42}{space 1}  -16.52{col 51}{space 3}0.000{col 59}{space 4} -46.9914{col 72}{space 3}-36.98589
{txt}{space 11}d_sy49 {c |}{col 19}{res}{space 2} -30.3205{col 31}{space 2} 7.738658{col 42}{space 1}   -3.92{col 51}{space 3}0.000{col 59}{space 4}-45.55245{col 72}{space 3}-15.08855
{txt}{space 11}d_sy50 {c |}{col 19}{res}{space 2}-31.06998{col 31}{space 2} 6.306297{col 42}{space 1}   -4.93{col 51}{space 3}0.000{col 59}{space 4}-43.48262{col 72}{space 3}-18.65734
{txt}{space 11}d_sy51 {c |}{col 19}{res}{space 2}-27.76583{col 31}{space 2} 5.480542{col 42}{space 1}   -5.07{col 51}{space 3}0.000{col 59}{space 4}-38.55315{col 72}{space 3}-16.97852
{txt}{space 11}d_sy52 {c |}{col 19}{res}{space 2} -33.5245{col 31}{space 2} 7.388663{col 42}{space 1}   -4.54{col 51}{space 3}0.000{col 59}{space 4}-48.06756{col 72}{space 3}-18.98144
{txt}{space 11}d_sy53 {c |}{col 19}{res}{space 2}-30.10713{col 31}{space 2} 7.963931{col 42}{space 1}   -3.78{col 51}{space 3}0.000{col 59}{space 4}-45.78248{col 72}{space 3}-14.43178
{txt}{space 11}d_sy54 {c |}{col 19}{res}{space 2}-35.79127{col 31}{space 2} 6.354259{col 42}{space 1}   -5.63{col 51}{space 3}0.000{col 59}{space 4}-48.29831{col 72}{space 3}-23.28422
{txt}{space 11}d_sy55 {c |}{col 19}{res}{space 2}-40.05172{col 31}{space 2} 6.045113{col 42}{space 1}   -6.63{col 51}{space 3}0.000{col 59}{space 4}-51.95027{col 72}{space 3}-28.15316
{txt}{space 11}d_sy56 {c |}{col 19}{res}{space 2}-39.14734{col 31}{space 2} 4.030451{col 42}{space 1}   -9.71{col 51}{space 3}0.000{col 59}{space 4}-47.08045{col 72}{space 3}-31.21423
{txt}{space 11}d_sy57 {c |}{col 19}{res}{space 2} 21.01807{col 31}{space 2} 3.954443{col 42}{space 1}    5.32{col 51}{space 3}0.000{col 59}{space 4} 13.23457{col 72}{space 3} 28.80157
{txt}{space 11}d_sy58 {c |}{col 19}{res}{space 2} 5.610571{col 31}{space 2} 2.634074{col 42}{space 1}    2.13{col 51}{space 3}0.034{col 59}{space 4} .4259412{col 72}{space 3}  10.7952
{txt}{space 11}d_sy59 {c |}{col 19}{res}{space 2} 12.41622{col 31}{space 2} 2.405188{col 42}{space 1}    5.16{col 51}{space 3}0.000{col 59}{space 4} 7.682105{col 72}{space 3} 17.15034
{txt}{space 11}d_sy60 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 11}d_sy61 {c |}{col 19}{res}{space 2}-41.51528{col 31}{space 2} 7.873364{col 42}{space 1}   -5.27{col 51}{space 3}0.000{col 59}{space 4}-57.01237{col 72}{space 3}-26.01819
{txt}{space 11}d_sy62 {c |}{col 19}{res}{space 2}-41.49318{col 31}{space 2} 6.980027{col 42}{space 1}   -5.94{col 51}{space 3}0.000{col 59}{space 4}-55.23192{col 72}{space 3}-27.75444
{txt}{space 11}d_sy63 {c |}{col 19}{res}{space 2}-45.11466{col 31}{space 2} 5.594492{col 42}{space 1}   -8.06{col 51}{space 3}0.000{col 59}{space 4}-56.12626{col 72}{space 3}-34.10306
{txt}{space 11}d_sy64 {c |}{col 19}{res}{space 2}-49.03428{col 31}{space 2} 4.777723{col 42}{space 1}  -10.26{col 51}{space 3}0.000{col 59}{space 4}-58.43824{col 72}{space 3}-39.63032
{txt}{space 11}d_sy65 {c |}{col 19}{res}{space 2}-48.40934{col 31}{space 2} 7.924214{col 42}{space 1}   -6.11{col 51}{space 3}0.000{col 59}{space 4}-64.00652{col 72}{space 3}-32.81216
{txt}{space 11}d_sy66 {c |}{col 19}{res}{space 2} -48.8772{col 31}{space 2} 6.383333{col 42}{space 1}   -7.66{col 51}{space 3}0.000{col 59}{space 4}-61.44147{col 72}{space 3}-36.31293
{txt}{space 11}d_sy67 {c |}{col 19}{res}{space 2}-51.68823{col 31}{space 2} 4.909209{col 42}{space 1}  -10.53{col 51}{space 3}0.000{col 59}{space 4}-61.35099{col 72}{space 3}-42.02546
{txt}{space 11}d_sy68 {c |}{col 19}{res}{space 2}-61.05044{col 31}{space 2} 4.296774{col 42}{space 1}  -14.21{col 51}{space 3}0.000{col 59}{space 4}-69.50775{col 72}{space 3}-52.59313
{txt}{space 11}d_sy69 {c |}{col 19}{res}{space 2}-37.70729{col 31}{space 2} 7.720127{col 42}{space 1}   -4.88{col 51}{space 3}0.000{col 59}{space 4}-52.90277{col 72}{space 3}-22.51182
{txt}{space 11}d_sy70 {c |}{col 19}{res}{space 2}-37.14946{col 31}{space 2} 6.961475{col 42}{space 1}   -5.34{col 51}{space 3}0.000{col 59}{space 4}-50.85169{col 72}{space 3}-23.44724
{txt}{space 11}d_sy71 {c |}{col 19}{res}{space 2} -40.0676{col 31}{space 2} 5.881452{col 42}{space 1}   -6.81{col 51}{space 3}0.000{col 59}{space 4}-51.64402{col 72}{space 3}-28.49118
{txt}{space 11}d_sy72 {c |}{col 19}{res}{space 2}-42.66916{col 31}{space 2}  5.37363{col 42}{space 1}   -7.94{col 51}{space 3}0.000{col 59}{space 4}-53.24604{col 72}{space 3}-32.09228
{txt}{space 11}d_sy73 {c |}{col 19}{res}{space 2} -42.8269{col 31}{space 2} 7.866007{col 42}{space 1}   -5.44{col 51}{space 3}0.000{col 59}{space 4}-58.30951{col 72}{space 3}-27.34429
{txt}{space 11}d_sy74 {c |}{col 19}{res}{space 2}-50.30775{col 31}{space 2} 5.889313{col 42}{space 1}   -8.54{col 51}{space 3}0.000{col 59}{space 4}-61.89965{col 72}{space 3}-38.71586
{txt}{space 11}d_sy75 {c |}{col 19}{res}{space 2}-51.37265{col 31}{space 2} 4.477232{col 42}{space 1}  -11.47{col 51}{space 3}0.000{col 59}{space 4}-60.18516{col 72}{space 3}-42.56015
{txt}{space 11}d_sy76 {c |}{col 19}{res}{space 2}-55.53753{col 31}{space 2} 3.544238{col 42}{space 1}  -15.67{col 51}{space 3}0.000{col 59}{space 4}-62.51363{col 72}{space 3}-48.56143
{txt}{space 11}d_sy77 {c |}{col 19}{res}{space 2}-23.33936{col 31}{space 2} 15.30096{col 42}{space 1}   -1.53{col 51}{space 3}0.128{col 59}{space 4}-53.45614{col 72}{space 3} 6.777412
{txt}{space 11}d_sy78 {c |}{col 19}{res}{space 2}-39.29442{col 31}{space 2} 9.324536{col 42}{space 1}   -4.21{col 51}{space 3}0.000{col 59}{space 4}-57.64784{col 72}{space 3}  -20.941
{txt}{space 11}d_sy79 {c |}{col 19}{res}{space 2} -37.0318{col 31}{space 2} 7.423545{col 42}{space 1}   -4.99{col 51}{space 3}0.000{col 59}{space 4}-51.64351{col 72}{space 3}-22.42008
{txt}{space 11}d_sy80 {c |}{col 19}{res}{space 2}-25.96976{col 31}{space 2}  8.29833{col 42}{space 1}   -3.13{col 51}{space 3}0.002{col 59}{space 4}-42.30331{col 72}{space 3}-9.636216
{txt}{space 11}d_sy81 {c |}{col 19}{res}{space 2}-27.52303{col 31}{space 2} 8.883251{col 42}{space 1}   -3.10{col 51}{space 3}0.002{col 59}{space 4}-45.00787{col 72}{space 3}-10.03818
{txt}{space 11}d_sy82 {c |}{col 19}{res}{space 2}-28.00734{col 31}{space 2} 7.544465{col 42}{space 1}   -3.71{col 51}{space 3}0.000{col 59}{space 4}-42.85706{col 72}{space 3}-13.15762
{txt}{space 11}d_sy83 {c |}{col 19}{res}{space 2}-9.031758{col 31}{space 2} 11.38131{col 42}{space 1}   -0.79{col 51}{space 3}0.428{col 59}{space 4}-31.43351{col 72}{space 3}    13.37
{txt}{space 11}d_sy84 {c |}{col 19}{res}{space 2}-32.30669{col 31}{space 2} 6.482957{col 42}{space 1}   -4.98{col 51}{space 3}0.000{col 59}{space 4}-45.06705{col 72}{space 3}-19.54633
{txt}{space 11}d_sy85 {c |}{col 19}{res}{space 2}-11.67192{col 31}{space 2} 8.570243{col 42}{space 1}   -1.36{col 51}{space 3}0.174{col 59}{space 4}-28.54068{col 72}{space 3} 5.196829
{txt}{space 11}d_sy86 {c |}{col 19}{res}{space 2}-27.07957{col 31}{space 2} 6.682041{col 42}{space 1}   -4.05{col 51}{space 3}0.000{col 59}{space 4}-40.23179{col 72}{space 3}-13.92736
{txt}{space 11}d_sy87 {c |}{col 19}{res}{space 2}-26.58067{col 31}{space 2} 5.720811{col 42}{space 1}   -4.65{col 51}{space 3}0.000{col 59}{space 4}-37.84091{col 72}{space 3}-15.32044
{txt}{space 11}d_sy88 {c |}{col 19}{res}{space 2}-30.62191{col 31}{space 2}  5.04984{col 42}{space 1}   -6.06{col 51}{space 3}0.000{col 59}{space 4}-40.56147{col 72}{space 3}-20.68234
{txt}{space 11}d_sy89 {c |}{col 19}{res}{space 2}-17.25422{col 31}{space 2} 7.905405{col 42}{space 1}   -2.18{col 51}{space 3}0.030{col 59}{space 4}-32.81438{col 72}{space 3}-1.694064
{txt}{space 11}d_sy90 {c |}{col 19}{res}{space 2}-19.79635{col 31}{space 2} 8.786467{col 42}{space 1}   -2.25{col 51}{space 3}0.025{col 59}{space 4}-37.09069{col 72}{space 3}-2.502005
{txt}{space 11}d_sy91 {c |}{col 19}{res}{space 2} -11.1984{col 31}{space 2} 9.265942{col 42}{space 1}   -1.21{col 51}{space 3}0.228{col 59}{space 4}-29.43649{col 72}{space 3} 7.039692
{txt}{space 11}d_sy92 {c |}{col 19}{res}{space 2}-24.75533{col 31}{space 2} 5.588683{col 42}{space 1}   -4.43{col 51}{space 3}0.000{col 59}{space 4}-35.75549{col 72}{space 3}-13.75516
{txt}{space 11}d_sy93 {c |}{col 19}{res}{space 2}-35.06422{col 31}{space 2} 8.011544{col 42}{space 1}   -4.38{col 51}{space 3}0.000{col 59}{space 4}-50.83329{col 72}{space 3}-19.29515
{txt}{space 11}d_sy94 {c |}{col 19}{res}{space 2}-35.83521{col 31}{space 2}  6.81362{col 42}{space 1}   -5.26{col 51}{space 3}0.000{col 59}{space 4}-49.24641{col 72}{space 3}-22.42401
{txt}{space 11}d_sy95 {c |}{col 19}{res}{space 2}-35.78605{col 31}{space 2} 5.426114{col 42}{space 1}   -6.60{col 51}{space 3}0.000{col 59}{space 4}-46.46624{col 72}{space 3}-25.10587
{txt}{space 11}d_sy96 {c |}{col 19}{res}{space 2}-39.39496{col 31}{space 2} 5.067318{col 42}{space 1}   -7.77{col 51}{space 3}0.000{col 59}{space 4}-49.36893{col 72}{space 3}  -29.421
{txt}{space 11}d_sy97 {c |}{col 19}{res}{space 2}-36.30278{col 31}{space 2}  9.02697{col 42}{space 1}   -4.02{col 51}{space 3}0.000{col 59}{space 4} -54.0705{col 72}{space 3}-18.53505
{txt}{space 11}d_sy98 {c |}{col 19}{res}{space 2}-41.12536{col 31}{space 2} 9.339109{col 42}{space 1}   -4.40{col 51}{space 3}0.000{col 59}{space 4}-59.50747{col 72}{space 3}-22.74326
{txt}{space 11}d_sy99 {c |}{col 19}{res}{space 2}-37.22724{col 31}{space 2} 9.473668{col 42}{space 1}   -3.93{col 51}{space 3}0.000{col 59}{space 4} -55.8742{col 72}{space 3}-18.58029
{txt}{space 10}d_sy100 {c |}{col 19}{res}{space 2}-48.24271{col 31}{space 2} 4.861032{col 42}{space 1}   -9.92{col 51}{space 3}0.000{col 59}{space 4}-57.81065{col 72}{space 3}-38.67478
{txt}{space 10}d_dist1 {c |}{col 19}{res}{space 2}-3.336084{col 31}{space 2} 2.205745{col 42}{space 1}   -1.51{col 51}{space 3}0.132{col 59}{space 4}-7.677638{col 72}{space 3}  1.00547
{txt}{space 10}d_dist2 {c |}{col 19}{res}{space 2} 5.894489{col 31}{space 2} 1.234738{col 42}{space 1}    4.77{col 51}{space 3}0.000{col 59}{space 4} 3.464163{col 72}{space 3} 8.324815
{txt}{space 10}d_dist3 {c |}{col 19}{res}{space 2}  14.1183{col 31}{space 2} 1.948457{col 42}{space 1}    7.25{col 51}{space 3}0.000{col 59}{space 4} 10.28317{col 72}{space 3} 17.95344
{txt}{space 10}d_dist4 {c |}{col 19}{res}{space 2} 18.07052{col 31}{space 2} 1.478751{col 42}{space 1}   12.22{col 51}{space 3}0.000{col 59}{space 4} 15.15991{col 72}{space 3} 20.98114
{txt}{space 10}d_dist5 {c |}{col 19}{res}{space 2}-4.121566{col 31}{space 2} 1.277832{col 42}{space 1}   -3.23{col 51}{space 3}0.001{col 59}{space 4}-6.636715{col 72}{space 3}-1.606417
{txt}{space 10}d_dist6 {c |}{col 19}{res}{space 2} 26.90219{col 31}{space 2}  1.23569{col 42}{space 1}   21.77{col 51}{space 3}0.000{col 59}{space 4} 24.46999{col 72}{space 3} 29.33439
{txt}{space 10}d_dist7 {c |}{col 19}{res}{space 2}  5.52304{col 31}{space 2} 1.339806{col 42}{space 1}    4.12{col 51}{space 3}0.000{col 59}{space 4} 2.885909{col 72}{space 3} 8.160171
{txt}{space 10}d_dist8 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 10}d_dist9 {c |}{col 19}{res}{space 2} 12.89383{col 31}{space 2}  .782812{col 42}{space 1}   16.47{col 51}{space 3}0.000{col 59}{space 4} 11.35302{col 72}{space 3} 14.43463
{txt}{space 9}d_dist10 {c |}{col 19}{res}{space 2}  4.59008{col 31}{space 2} .7634171{col 42}{space 1}    6.01{col 51}{space 3}0.000{col 59}{space 4} 3.087451{col 72}{space 3} 6.092709
{txt}{space 9}d_dist11 {c |}{col 19}{res}{space 2}-1.546982{col 31}{space 2} 1.013847{col 42}{space 1}   -1.53{col 51}{space 3}0.128{col 59}{space 4}-3.542531{col 72}{space 3} .4485661
{txt}{space 9}d_dist12 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 9}d_dist13 {c |}{col 19}{res}{space 2} 16.71315{col 31}{space 2} .0480655{col 42}{space 1}  347.72{col 51}{space 3}0.000{col 59}{space 4} 16.61854{col 72}{space 3} 16.80776
{txt}{space 9}d_dist14 {c |}{col 19}{res}{space 2} 14.68035{col 31}{space 2} .7738469{col 42}{space 1}   18.97{col 51}{space 3}0.000{col 59}{space 4} 13.15719{col 72}{space 3}  16.2035
{txt}{space 9}d_dist15 {c |}{col 19}{res}{space 2} 23.60729{col 31}{space 2} 1.404469{col 42}{space 1}   16.81{col 51}{space 3}0.000{col 59}{space 4} 20.84288{col 72}{space 3} 26.37169
{txt}{space 9}d_dist16 {c |}{col 19}{res}{space 2} 28.95882{col 31}{space 2} 1.032459{col 42}{space 1}   28.05{col 51}{space 3}0.000{col 59}{space 4} 26.92664{col 72}{space 3}   30.991
{txt}{space 9}d_dist17 {c |}{col 19}{res}{space 2} 31.52262{col 31}{space 2} .8997134{col 42}{space 1}   35.04{col 51}{space 3}0.000{col 59}{space 4} 29.75172{col 72}{space 3} 33.29352
{txt}{space 9}d_dist18 {c |}{col 19}{res}{space 2} 31.85569{col 31}{space 2} 26.48433{col 42}{space 1}    1.20{col 51}{space 3}0.230{col 59}{space 4}-20.27324{col 72}{space 3} 83.98462
{txt}{space 9}d_dist19 {c |}{col 19}{res}{space 2} 2.826409{col 31}{space 2} 7.345988{col 42}{space 1}    0.38{col 51}{space 3}0.701{col 59}{space 4}-11.63265{col 72}{space 3} 17.28547
{txt}{space 9}d_dist20 {c |}{col 19}{res}{space 2} 19.72279{col 31}{space 2}  .838928{col 42}{space 1}   23.51{col 51}{space 3}0.000{col 59}{space 4} 18.07153{col 72}{space 3} 21.37404
{txt}{space 9}d_dist21 {c |}{col 19}{res}{space 2}   17.351{col 31}{space 2} .8550712{col 42}{space 1}   20.29{col 51}{space 3}0.000{col 59}{space 4} 15.66797{col 72}{space 3} 19.03403
{txt}{space 9}d_dist22 {c |}{col 19}{res}{space 2} 16.22595{col 31}{space 2} .8258377{col 42}{space 1}   19.65{col 51}{space 3}0.000{col 59}{space 4} 14.60046{col 72}{space 3} 17.85144
{txt}{space 9}d_dist23 {c |}{col 19}{res}{space 2} 14.76082{col 31}{space 2}  .955831{col 42}{space 1}   15.44{col 51}{space 3}0.000{col 59}{space 4} 12.87946{col 72}{space 3} 16.64217
{txt}{space 9}d_dist24 {c |}{col 19}{res}{space 2} 16.40581{col 31}{space 2}  .955831{col 42}{space 1}   17.16{col 51}{space 3}0.000{col 59}{space 4} 14.52446{col 72}{space 3} 18.28717
{txt}{space 9}d_dist25 {c |}{col 19}{res}{space 2} 15.11066{col 31}{space 2} .8096696{col 42}{space 1}   18.66{col 51}{space 3}0.000{col 59}{space 4}   13.517{col 72}{space 3} 16.70433
{txt}{space 9}d_dist26 {c |}{col 19}{res}{space 2} 16.39086{col 31}{space 2} 1.300569{col 42}{space 1}   12.60{col 51}{space 3}0.000{col 59}{space 4} 13.83095{col 72}{space 3} 18.95076
{txt}{space 9}d_dist27 {c |}{col 19}{res}{space 2} 18.47178{col 31}{space 2} .7215201{col 42}{space 1}   25.60{col 51}{space 3}0.000{col 59}{space 4} 17.05162{col 72}{space 3} 19.89195
{txt}{space 9}d_dist28 {c |}{col 19}{res}{space 2} 18.53516{col 31}{space 2} 1.213709{col 42}{space 1}   15.27{col 51}{space 3}0.000{col 59}{space 4} 16.14622{col 72}{space 3}  20.9241
{txt}{space 9}d_dist29 {c |}{col 19}{res}{space 2} 20.37526{col 31}{space 2} .8448672{col 42}{space 1}   24.12{col 51}{space 3}0.000{col 59}{space 4} 18.71231{col 72}{space 3}  22.0382
{txt}{space 9}d_dist30 {c |}{col 19}{res}{space 2} 65.46554{col 31}{space 2} 24.53477{col 42}{space 1}    2.67{col 51}{space 3}0.008{col 59}{space 4} 17.17391{col 72}{space 3} 113.7572
{txt}{space 9}d_dist31 {c |}{col 19}{res}{space 2} 6.171671{col 31}{space 2}  1.36381{col 42}{space 1}    4.53{col 51}{space 3}0.000{col 59}{space 4} 3.487294{col 72}{space 3} 8.856048
{txt}{space 9}d_dist32 {c |}{col 19}{res}{space 2} 3.425178{col 31}{space 2} .8389837{col 42}{space 1}    4.08{col 51}{space 3}0.000{col 59}{space 4} 1.773812{col 72}{space 3} 5.076544
{txt}{space 9}d_dist33 {c |}{col 19}{res}{space 2} 3.583348{col 31}{space 2} 1.028667{col 42}{space 1}    3.48{col 51}{space 3}0.001{col 59}{space 4}  1.55863{col 72}{space 3} 5.608065
{txt}{space 9}d_dist34 {c |}{col 19}{res}{space 2}-.0167927{col 31}{space 2}  .933811{col 42}{space 1}   -0.02{col 51}{space 3}0.986{col 59}{space 4}-1.854807{col 72}{space 3} 1.821221
{txt}{space 9}d_dist35 {c |}{col 19}{res}{space 2} 9.751301{col 31}{space 2} 1.274218{col 42}{space 1}    7.65{col 51}{space 3}0.000{col 59}{space 4} 7.243265{col 72}{space 3} 12.25934
{txt}{space 9}d_dist36 {c |}{col 19}{res}{space 2} 25.15963{col 31}{space 2}  .778859{col 42}{space 1}   32.30{col 51}{space 3}0.000{col 59}{space 4} 23.62661{col 72}{space 3} 26.69266
{txt}{space 9}d_dist37 {c |}{col 19}{res}{space 2} 12.06011{col 31}{space 2} .9221706{col 42}{space 1}   13.08{col 51}{space 3}0.000{col 59}{space 4} 10.24501{col 72}{space 3} 13.87522
{txt}{space 9}d_dist38 {c |}{col 19}{res}{space 2} 19.01278{col 31}{space 2} 1.714686{col 42}{space 1}   11.09{col 51}{space 3}0.000{col 59}{space 4} 15.63778{col 72}{space 3} 22.38779
{txt}{space 9}d_dist39 {c |}{col 19}{res}{space 2} 33.90332{col 31}{space 2}  .955831{col 42}{space 1}   35.47{col 51}{space 3}0.000{col 59}{space 4} 32.02196{col 72}{space 3} 35.78467
{txt}{space 9}d_dist40 {c |}{col 19}{res}{space 2} 35.64832{col 31}{space 2} .9501525{col 42}{space 1}   37.52{col 51}{space 3}0.000{col 59}{space 4} 33.77814{col 72}{space 3}  37.5185
{txt}{space 9}d_dist41 {c |}{col 19}{res}{space 2} 37.24149{col 31}{space 2} .7417399{col 42}{space 1}   50.21{col 51}{space 3}0.000{col 59}{space 4} 35.78153{col 72}{space 3} 38.70145
{txt}{space 9}d_dist42 {c |}{col 19}{res}{space 2} 19.29832{col 31}{space 2}  .955831{col 42}{space 1}   20.19{col 51}{space 3}0.000{col 59}{space 4} 17.41696{col 72}{space 3} 21.17967
{txt}{space 9}d_dist43 {c |}{col 19}{res}{space 2} 30.32832{col 31}{space 2}  .955831{col 42}{space 1}   31.73{col 51}{space 3}0.000{col 59}{space 4} 28.44696{col 72}{space 3} 32.20967
{txt}{space 9}d_dist44 {c |}{col 19}{res}{space 2} 8.582172{col 31}{space 2} .8675335{col 42}{space 1}    9.89{col 51}{space 3}0.000{col 59}{space 4} 6.874612{col 72}{space 3} 10.28973
{txt}{space 9}d_dist45 {c |}{col 19}{res}{space 2} 31.25582{col 31}{space 2}  .955831{col 42}{space 1}   32.70{col 51}{space 3}0.000{col 59}{space 4} 29.37446{col 72}{space 3} 33.13717
{txt}{space 9}d_dist46 {c |}{col 19}{res}{space 2} 30.05263{col 31}{space 2} .9275435{col 42}{space 1}   32.40{col 51}{space 3}0.000{col 59}{space 4} 28.22695{col 72}{space 3}  31.8783
{txt}{space 9}d_dist47 {c |}{col 19}{res}{space 2} 8.455817{col 31}{space 2}  .955831{col 42}{space 1}    8.85{col 51}{space 3}0.000{col 59}{space 4} 6.574461{col 72}{space 3} 10.33717
{txt}{space 9}d_dist48 {c |}{col 19}{res}{space 2} 9.192562{col 31}{space 2} .8559708{col 42}{space 1}   10.74{col 51}{space 3}0.000{col 59}{space 4} 7.507761{col 72}{space 3} 10.87736
{txt}{space 9}d_dist49 {c |}{col 19}{res}{space 2} 22.25478{col 31}{space 2} 8.000949{col 42}{space 1}    2.78{col 51}{space 3}0.006{col 59}{space 4} 6.506568{col 72}{space 3}   38.003
{txt}{space 9}d_dist50 {c |}{col 19}{res}{space 2} 15.58042{col 31}{space 2} .9602248{col 42}{space 1}   16.23{col 51}{space 3}0.000{col 59}{space 4} 13.69042{col 72}{space 3} 17.47043
{txt}{space 9}d_dist51 {c |}{col 19}{res}{space 2} 7.429195{col 31}{space 2} 1.901547{col 42}{space 1}    3.91{col 51}{space 3}0.000{col 59}{space 4} 3.686392{col 72}{space 3}   11.172
{txt}{space 9}d_dist52 {c |}{col 19}{res}{space 2} .3900888{col 31}{space 2} .7844691{col 42}{space 1}    0.50{col 51}{space 3}0.619{col 59}{space 4}-1.153976{col 72}{space 3} 1.934154
{txt}{space 9}d_dist53 {c |}{col 19}{res}{space 2} 8.999453{col 31}{space 2} 7.421338{col 42}{space 1}    1.21{col 51}{space 3}0.226{col 59}{space 4}-5.607918{col 72}{space 3} 23.60682
{txt}{space 9}d_dist54 {c |}{col 19}{res}{space 2} 3.744558{col 31}{space 2} .7901111{col 42}{space 1}    4.74{col 51}{space 3}0.000{col 59}{space 4} 2.189387{col 72}{space 3} 5.299728
{txt}{space 9}d_dist55 {c |}{col 19}{res}{space 2} 6.233317{col 31}{space 2}  .955831{col 42}{space 1}    6.52{col 51}{space 3}0.000{col 59}{space 4} 4.351961{col 72}{space 3} 8.114673
{txt}{space 9}d_dist56 {c |}{col 19}{res}{space 2} 5.474638{col 31}{space 2} 1.184863{col 42}{space 1}    4.62{col 51}{space 3}0.000{col 59}{space 4} 3.142481{col 72}{space 3} 7.806795
{txt}{space 9}d_dist57 {c |}{col 19}{res}{space 2} 6.666901{col 31}{space 2} .7633852{col 42}{space 1}    8.73{col 51}{space 3}0.000{col 59}{space 4} 5.164335{col 72}{space 3} 8.169467
{txt}{space 9}d_dist58 {c |}{col 19}{res}{space 2} .0058169{col 31}{space 2}  .955831{col 42}{space 1}    0.01{col 51}{space 3}0.995{col 59}{space 4}-1.875539{col 72}{space 3} 1.887173
{txt}{space 9}d_dist59 {c |}{col 19}{res}{space 2} 8.951488{col 31}{space 2} .9517973{col 42}{space 1}    9.40{col 51}{space 3}0.000{col 59}{space 4} 7.078072{col 72}{space 3}  10.8249
{txt}{space 9}d_dist60 {c |}{col 19}{res}{space 2} 10.82027{col 31}{space 2} .9096747{col 42}{space 1}   11.89{col 51}{space 3}0.000{col 59}{space 4} 9.029767{col 72}{space 3} 12.61078
{txt}{space 9}d_dist61 {c |}{col 19}{res}{space 2} 11.58205{col 31}{space 2} .9199961{col 42}{space 1}   12.59{col 51}{space 3}0.000{col 59}{space 4} 9.771224{col 72}{space 3} 13.39287
{txt}{space 9}d_dist62 {c |}{col 19}{res}{space 2} 20.33229{col 31}{space 2} 1.807196{col 42}{space 1}   11.25{col 51}{space 3}0.000{col 59}{space 4}  16.7752{col 72}{space 3} 23.88938
{txt}{space 9}d_dist63 {c |}{col 19}{res}{space 2} 5.843543{col 31}{space 2} 2.178615{col 42}{space 1}    2.68{col 51}{space 3}0.008{col 59}{space 4}  1.55539{col 72}{space 3}  10.1317
{txt}{space 9}d_dist64 {c |}{col 19}{res}{space 2}-2.551482{col 31}{space 2} 2.187893{col 42}{space 1}   -1.17{col 51}{space 3}0.245{col 59}{space 4}-6.857898{col 72}{space 3} 1.754934
{txt}{space 9}d_dist65 {c |}{col 19}{res}{space 2}-10.60035{col 31}{space 2} 3.737362{col 42}{space 1}   -2.84{col 51}{space 3}0.005{col 59}{space 4}-17.95657{col 72}{space 3}-3.244124
{txt}{space 9}d_dist66 {c |}{col 19}{res}{space 2}   9.2319{col 31}{space 2} .0479217{col 42}{space 1}  192.65{col 51}{space 3}0.000{col 59}{space 4} 9.137576{col 72}{space 3} 9.326224
{txt}{space 9}d_dist67 {c |}{col 19}{res}{space 2} .9897005{col 31}{space 2} 2.134963{col 42}{space 1}    0.46{col 51}{space 3}0.643{col 59}{space 4}-3.212533{col 72}{space 3} 5.191934
{txt}{space 9}d_dist68 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 9}d_dist69 {c |}{col 19}{res}{space 2} -27.2277{col 31}{space 2} 3.128263{col 42}{space 1}   -8.70{col 51}{space 3}0.000{col 59}{space 4}-33.38504{col 72}{space 3}-21.07036
{txt}{space 9}d_dist70 {c |}{col 19}{res}{space 2}-27.92069{col 31}{space 2} 3.228272{col 42}{space 1}   -8.65{col 51}{space 3}0.000{col 59}{space 4}-34.27488{col 72}{space 3}-21.56651
{txt}{space 9}d_dist71 {c |}{col 19}{res}{space 2}-53.06336{col 31}{space 2} 6.376863{col 42}{space 1}   -8.32{col 51}{space 3}0.000{col 59}{space 4} -65.6149{col 72}{space 3}-40.51182
{txt}{space 9}d_dist72 {c |}{col 19}{res}{space 2}-35.57324{col 31}{space 2} 5.961874{col 42}{space 1}   -5.97{col 51}{space 3}0.000{col 59}{space 4}-47.30796{col 72}{space 3}-23.83853
{txt}{space 9}d_dist73 {c |}{col 19}{res}{space 2} 8.040182{col 31}{space 2} .8574212{col 42}{space 1}    9.38{col 51}{space 3}0.000{col 59}{space 4} 6.352525{col 72}{space 3} 9.727838
{txt}{space 9}d_dist74 {c |}{col 19}{res}{space 2}  14.1076{col 31}{space 2} .8578538{col 42}{space 1}   16.45{col 51}{space 3}0.000{col 59}{space 4} 12.41909{col 72}{space 3}  15.7961
{txt}{space 9}d_dist75 {c |}{col 19}{res}{space 2}-.7849028{col 31}{space 2} .8578538{col 42}{space 1}   -0.91{col 51}{space 3}0.361{col 59}{space 4}-2.473411{col 72}{space 3}  .903605
{txt}{space 9}d_dist76 {c |}{col 19}{res}{space 2} 9.690096{col 31}{space 2} .8578538{col 42}{space 1}   11.30{col 51}{space 3}0.000{col 59}{space 4} 8.001588{col 72}{space 3}  11.3786
{txt}{space 9}d_dist77 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 9}d_dist78 {c |}{col 19}{res}{space 2}-17.38457{col 31}{space 2} 1.129153{col 42}{space 1}  -15.40{col 51}{space 3}0.000{col 59}{space 4}-19.60707{col 72}{space 3}-15.16206
{txt}{space 9}d_dist79 {c |}{col 19}{res}{space 2} 8.777928{col 31}{space 2} .8575457{col 42}{space 1}   10.24{col 51}{space 3}0.000{col 59}{space 4} 7.090027{col 72}{space 3} 10.46583
{txt}{space 9}d_dist80 {c |}{col 19}{res}{space 2}-23.84921{col 31}{space 2} 1.026309{col 42}{space 1}  -23.24{col 51}{space 3}0.000{col 59}{space 4}-25.86929{col 72}{space 3}-21.82913
{txt}{space 9}d_dist81 {c |}{col 19}{res}{space 2}-2.727347{col 31}{space 2} .8643185{col 42}{space 1}   -3.16{col 51}{space 3}0.002{col 59}{space 4}-4.428579{col 72}{space 3}-1.026115
{txt}{space 9}d_dist82 {c |}{col 19}{res}{space 2}-21.14323{col 31}{space 2} 1.480876{col 42}{space 1}  -14.28{col 51}{space 3}0.000{col 59}{space 4}-24.05803{col 72}{space 3}-18.22843
{txt}{space 9}d_dist83 {c |}{col 19}{res}{space 2}-23.26608{col 31}{space 2} .7994469{col 42}{space 1}  -29.10{col 51}{space 3}0.000{col 59}{space 4}-24.83963{col 72}{space 3}-21.69253
{txt}{space 9}d_dist84 {c |}{col 19}{res}{space 2} .1946778{col 31}{space 2} .8582279{col 42}{space 1}    0.23{col 51}{space 3}0.821{col 59}{space 4}-1.494566{col 72}{space 3} 1.883922
{txt}{space 9}d_dist85 {c |}{col 19}{res}{space 2}-16.02057{col 31}{space 2} .8588015{col 42}{space 1}  -18.65{col 51}{space 3}0.000{col 59}{space 4}-17.71095{col 72}{space 3} -14.3302
{txt}{space 9}d_dist86 {c |}{col 19}{res}{space 2}-18.05063{col 31}{space 2} 1.104146{col 42}{space 1}  -16.35{col 51}{space 3}0.000{col 59}{space 4}-20.22391{col 72}{space 3}-15.87735
{txt}{space 9}d_dist87 {c |}{col 19}{res}{space 2}-14.14027{col 31}{space 2} 1.268584{col 42}{space 1}  -11.15{col 51}{space 3}0.000{col 59}{space 4}-16.63722{col 72}{space 3}-11.64333
{txt}{space 9}d_dist88 {c |}{col 19}{res}{space 2}-10.27065{col 31}{space 2} .9394383{col 42}{space 1}  -10.93{col 51}{space 3}0.000{col 59}{space 4}-12.11974{col 72}{space 3}-8.421557
{txt}{space 9}d_dist89 {c |}{col 19}{res}{space 2}  -8.2077{col 31}{space 2} 1.228899{col 42}{space 1}   -6.68{col 51}{space 3}0.000{col 59}{space 4}-10.62653{col 72}{space 3}-5.788867
{txt}{space 9}d_dist90 {c |}{col 19}{res}{space 2}-5.690579{col 31}{space 2} .4598005{col 42}{space 1}  -12.38{col 51}{space 3}0.000{col 59}{space 4}-6.595602{col 72}{space 3}-4.785557
{txt}{space 9}d_dist91 {c |}{col 19}{res}{space 2}-9.851847{col 31}{space 2} .8661849{col 42}{space 1}  -11.37{col 51}{space 3}0.000{col 59}{space 4}-11.55675{col 72}{space 3}-8.146941
{txt}{space 9}d_dist92 {c |}{col 19}{res}{space 2} 16.27063{col 31}{space 2} 1.092464{col 42}{space 1}   14.89{col 51}{space 3}0.000{col 59}{space 4} 14.12034{col 72}{space 3} 18.42092
{txt}{space 9}d_dist93 {c |}{col 19}{res}{space 2} 2.406087{col 31}{space 2} .9346631{col 42}{space 1}    2.57{col 51}{space 3}0.011{col 59}{space 4} .5663961{col 72}{space 3} 4.245778
{txt}{space 9}d_dist94 {c |}{col 19}{res}{space 2} 7.314256{col 31}{space 2} .5951627{col 42}{space 1}   12.29{col 51}{space 3}0.000{col 59}{space 4} 6.142801{col 72}{space 3} 8.485711
{txt}{space 9}d_dist95 {c |}{col 19}{res}{space 2} 11.35243{col 31}{space 2} .4336799{col 42}{space 1}   26.18{col 51}{space 3}0.000{col 59}{space 4} 10.49882{col 72}{space 3} 12.20604
{txt}{space 9}d_dist96 {c |}{col 19}{res}{space 2} 16.56143{col 31}{space 2} .9924365{col 42}{space 1}   16.69{col 51}{space 3}0.000{col 59}{space 4} 14.60802{col 72}{space 3} 18.51484
{txt}{space 9}d_dist97 {c |}{col 19}{res}{space 2} 12.98247{col 31}{space 2} .9509941{col 42}{space 1}   13.65{col 51}{space 3}0.000{col 59}{space 4} 11.11064{col 72}{space 3} 14.85431
{txt}{space 9}d_dist98 {c |}{col 19}{res}{space 2} 6.476419{col 31}{space 2} .6683692{col 42}{space 1}    9.69{col 51}{space 3}0.000{col 59}{space 4} 5.160873{col 72}{space 3} 7.791966
{txt}{space 9}d_dist99 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist100 {c |}{col 19}{res}{space 2}-1.024399{col 31}{space 2} 1.036918{col 42}{space 1}   -0.99{col 51}{space 3}0.324{col 59}{space 4}-3.065357{col 72}{space 3} 1.016559
{txt}{space 8}d_dist101 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist102 {c |}{col 19}{res}{space 2}-37.98483{col 31}{space 2} 1.767378{col 42}{space 1}  -21.49{col 51}{space 3}0.000{col 59}{space 4}-41.46354{col 72}{space 3}-34.50611
{txt}{space 8}d_dist103 {c |}{col 19}{res}{space 2}-28.78295{col 31}{space 2} 1.967737{col 42}{space 1}  -14.63{col 51}{space 3}0.000{col 59}{space 4}-32.65603{col 72}{space 3}-24.90987
{txt}{space 8}d_dist104 {c |}{col 19}{res}{space 2}-22.70049{col 31}{space 2} 1.313845{col 42}{space 1}  -17.28{col 51}{space 3}0.000{col 59}{space 4}-25.28652{col 72}{space 3}-20.11445
{txt}{space 8}d_dist105 {c |}{col 19}{res}{space 2}-5.454365{col 31}{space 2} 1.896595{col 42}{space 1}   -2.88{col 51}{space 3}0.004{col 59}{space 4}-9.187419{col 72}{space 3} -1.72131
{txt}{space 8}d_dist106 {c |}{col 19}{res}{space 2} 1.298318{col 31}{space 2} 1.464383{col 42}{space 1}    0.89{col 51}{space 3}0.376{col 59}{space 4}-1.584017{col 72}{space 3} 4.180653
{txt}{space 8}d_dist107 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist108 {c |}{col 19}{res}{space 2} 14.57171{col 31}{space 2} 1.441407{col 42}{space 1}   10.11{col 51}{space 3}0.000{col 59}{space 4}  11.7346{col 72}{space 3} 17.40883
{txt}{space 8}d_dist109 {c |}{col 19}{res}{space 2} 9.787545{col 31}{space 2} 1.439453{col 42}{space 1}    6.80{col 51}{space 3}0.000{col 59}{space 4} 6.954279{col 72}{space 3} 12.62081
{txt}{space 8}d_dist110 {c |}{col 19}{res}{space 2} -4.58568{col 31}{space 2} 1.507543{col 42}{space 1}   -3.04{col 51}{space 3}0.003{col 59}{space 4}-7.552968{col 72}{space 3}-1.618393
{txt}{space 8}d_dist111 {c |}{col 19}{res}{space 2} 15.01723{col 31}{space 2}  1.45157{col 42}{space 1}   10.35{col 51}{space 3}0.000{col 59}{space 4} 12.16012{col 72}{space 3} 17.87435
{txt}{space 8}d_dist112 {c |}{col 19}{res}{space 2} 7.855253{col 31}{space 2} 1.516504{col 42}{space 1}    5.18{col 51}{space 3}0.000{col 59}{space 4} 4.870328{col 72}{space 3} 10.84018
{txt}{space 8}d_dist113 {c |}{col 19}{res}{space 2} 13.28025{col 31}{space 2} 2.083125{col 42}{space 1}    6.38{col 51}{space 3}0.000{col 59}{space 4} 9.180048{col 72}{space 3} 17.38045
{txt}{space 8}d_dist114 {c |}{col 19}{res}{space 2} 18.54427{col 31}{space 2} 2.050205{col 42}{space 1}    9.05{col 51}{space 3}0.000{col 59}{space 4} 14.50887{col 72}{space 3} 22.57967
{txt}{space 8}d_dist115 {c |}{col 19}{res}{space 2} 11.22244{col 31}{space 2} 1.699294{col 42}{space 1}    6.60{col 51}{space 3}0.000{col 59}{space 4} 7.877731{col 72}{space 3} 14.56715
{txt}{space 8}d_dist116 {c |}{col 19}{res}{space 2} 10.90568{col 31}{space 2} 1.706338{col 42}{space 1}    6.39{col 51}{space 3}0.000{col 59}{space 4} 7.547105{col 72}{space 3} 14.26425
{txt}{space 8}d_dist117 {c |}{col 19}{res}{space 2} 10.20797{col 31}{space 2} 2.171235{col 42}{space 1}    4.70{col 51}{space 3}0.000{col 59}{space 4} 5.934343{col 72}{space 3}  14.4816
{txt}{space 8}d_dist118 {c |}{col 19}{res}{space 2}-4.763585{col 31}{space 2} 1.434772{col 42}{space 1}   -3.32{col 51}{space 3}0.001{col 59}{space 4}-7.587637{col 72}{space 3}-1.939532
{txt}{space 8}d_dist119 {c |}{col 19}{res}{space 2} 8.633296{col 31}{space 2} 1.692877{col 42}{space 1}    5.10{col 51}{space 3}0.000{col 59}{space 4} 5.301217{col 72}{space 3} 11.96537
{txt}{space 8}d_dist120 {c |}{col 19}{res}{space 2} 29.08912{col 31}{space 2} 1.937226{col 42}{space 1}   15.02{col 51}{space 3}0.000{col 59}{space 4} 25.27609{col 72}{space 3} 32.90215
{txt}{space 8}d_dist121 {c |}{col 19}{res}{space 2}  16.4142{col 31}{space 2} 1.646429{col 42}{space 1}    9.97{col 51}{space 3}0.000{col 59}{space 4} 13.17354{col 72}{space 3} 19.65485
{txt}{space 8}d_dist122 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist123 {c |}{col 19}{res}{space 2} 17.49246{col 31}{space 2} 2.090628{col 42}{space 1}    8.37{col 51}{space 3}0.000{col 59}{space 4}  13.3775{col 72}{space 3} 21.60743
{txt}{space 8}d_dist124 {c |}{col 19}{res}{space 2} 16.74974{col 31}{space 2} 2.079334{col 42}{space 1}    8.06{col 51}{space 3}0.000{col 59}{space 4}   12.657{col 72}{space 3} 20.84248
{txt}{space 8}d_dist125 {c |}{col 19}{res}{space 2} 14.44264{col 31}{space 2} 2.075029{col 42}{space 1}    6.96{col 51}{space 3}0.000{col 59}{space 4} 10.35838{col 72}{space 3} 18.52691
{txt}{space 8}d_dist126 {c |}{col 19}{res}{space 2} 14.72567{col 31}{space 2} 1.237254{col 42}{space 1}   11.90{col 51}{space 3}0.000{col 59}{space 4} 12.29039{col 72}{space 3} 17.16095
{txt}{space 8}d_dist127 {c |}{col 19}{res}{space 2} 17.21836{col 31}{space 2} 1.253707{col 42}{space 1}   13.73{col 51}{space 3}0.000{col 59}{space 4}  14.7507{col 72}{space 3} 19.68603
{txt}{space 8}d_dist128 {c |}{col 19}{res}{space 2} 13.41169{col 31}{space 2} 1.236833{col 42}{space 1}   10.84{col 51}{space 3}0.000{col 59}{space 4} 10.97725{col 72}{space 3} 15.84614
{txt}{space 8}d_dist129 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist130 {c |}{col 19}{res}{space 2} 10.61832{col 31}{space 2} 1.234203{col 42}{space 1}    8.60{col 51}{space 3}0.000{col 59}{space 4}  8.18905{col 72}{space 3}  13.0476
{txt}{space 8}d_dist131 {c |}{col 19}{res}{space 2} 2.427436{col 31}{space 2} 1.254116{col 42}{space 1}    1.94{col 51}{space 3}0.054{col 59}{space 4} -.041031{col 72}{space 3} 4.895904
{txt}{space 8}d_dist132 {c |}{col 19}{res}{space 2} 20.03478{col 31}{space 2}  1.28813{col 42}{space 1}   15.55{col 51}{space 3}0.000{col 59}{space 4} 17.49936{col 72}{space 3}  22.5702
{txt}{space 8}d_dist133 {c |}{col 19}{res}{space 2} 7.144936{col 31}{space 2} 1.254116{col 42}{space 1}    5.70{col 51}{space 3}0.000{col 59}{space 4} 4.676469{col 72}{space 3} 9.613403
{txt}{space 8}d_dist134 {c |}{col 19}{res}{space 2} 20.76994{col 31}{space 2} 1.254116{col 42}{space 1}   16.56{col 51}{space 3}0.000{col 59}{space 4} 18.30147{col 72}{space 3}  23.2384
{txt}{space 8}d_dist135 {c |}{col 19}{res}{space 2} 36.05508{col 31}{space 2} 2.080113{col 42}{space 1}   17.33{col 51}{space 3}0.000{col 59}{space 4} 31.96081{col 72}{space 3} 40.14936
{txt}{space 8}d_dist136 {c |}{col 19}{res}{space 2} 37.90994{col 31}{space 2} 1.254116{col 42}{space 1}   30.23{col 51}{space 3}0.000{col 59}{space 4} 35.44147{col 72}{space 3}  40.3784
{txt}{space 8}d_dist137 {c |}{col 19}{res}{space 2} 26.45615{col 31}{space 2} 1.236544{col 42}{space 1}   21.40{col 51}{space 3}0.000{col 59}{space 4} 24.02227{col 72}{space 3} 28.89003
{txt}{space 8}d_dist138 {c |}{col 19}{res}{space 2}-4.343076{col 31}{space 2} 4.318324{col 42}{space 1}   -1.01{col 51}{space 3}0.315{col 59}{space 4} -12.8428{col 72}{space 3} 4.156653
{txt}{space 8}d_dist139 {c |}{col 19}{res}{space 2}-5.761113{col 31}{space 2} .8345299{col 42}{space 1}   -6.90{col 51}{space 3}0.000{col 59}{space 4}-7.403713{col 72}{space 3}-4.118514
{txt}{space 8}d_dist140 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist141 {c |}{col 19}{res}{space 2} 1.890861{col 31}{space 2} .8250724{col 42}{space 1}    2.29{col 51}{space 3}0.023{col 59}{space 4} .2668768{col 72}{space 3} 3.514846
{txt}{space 8}d_dist142 {c |}{col 19}{res}{space 2} 10.82547{col 31}{space 2} 1.773838{col 42}{space 1}    6.10{col 51}{space 3}0.000{col 59}{space 4} 7.334041{col 72}{space 3} 14.31691
{txt}{space 8}d_dist143 {c |}{col 19}{res}{space 2}-11.12284{col 31}{space 2} 1.433656{col 42}{space 1}   -7.76{col 51}{space 3}0.000{col 59}{space 4}-13.94469{col 72}{space 3} -8.30098
{txt}{space 8}d_dist144 {c |}{col 19}{res}{space 2} 3.388479{col 31}{space 2} 2.150644{col 42}{space 1}    1.58{col 51}{space 3}0.116{col 59}{space 4}-.8446194{col 72}{space 3} 7.621577
{txt}{space 8}d_dist145 {c |}{col 19}{res}{space 2}-2.018595{col 31}{space 2} .8576572{col 42}{space 1}   -2.35{col 51}{space 3}0.019{col 59}{space 4}-3.706716{col 72}{space 3}-.3304741
{txt}{space 8}d_dist146 {c |}{col 19}{res}{space 2} 11.62003{col 31}{space 2} 1.712693{col 42}{space 1}    6.78{col 51}{space 3}0.000{col 59}{space 4} 8.248947{col 72}{space 3} 14.99111
{txt}{space 8}d_dist147 {c |}{col 19}{res}{space 2}-4.175999{col 31}{space 2} 1.693386{col 42}{space 1}   -2.47{col 51}{space 3}0.014{col 59}{space 4}-7.509079{col 72}{space 3}-.8429192
{txt}{space 8}d_dist148 {c |}{col 19}{res}{space 2}-7.326288{col 31}{space 2} 2.552075{col 42}{space 1}   -2.87{col 51}{space 3}0.004{col 59}{space 4}-12.34952{col 72}{space 3}-2.303056
{txt}{space 8}d_dist149 {c |}{col 19}{res}{space 2}  -7.4669{col 31}{space 2} 1.691332{col 42}{space 1}   -4.41{col 51}{space 3}0.000{col 59}{space 4}-10.79594{col 72}{space 3}-4.137863
{txt}{space 8}d_dist150 {c |}{col 19}{res}{space 2}-9.056046{col 31}{space 2} 2.484333{col 42}{space 1}   -3.65{col 51}{space 3}0.000{col 59}{space 4}-13.94594{col 72}{space 3}-4.166151
{txt}{space 8}d_dist151 {c |}{col 19}{res}{space 2}-5.077647{col 31}{space 2} 1.743956{col 42}{space 1}   -2.91{col 51}{space 3}0.004{col 59}{space 4}-8.510263{col 72}{space 3}-1.645031
{txt}{space 8}d_dist152 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist153 {c |}{col 19}{res}{space 2} 2.717158{col 31}{space 2} 1.786907{col 42}{space 1}    1.52{col 51}{space 3}0.129{col 59}{space 4}-.7999997{col 72}{space 3} 6.234315
{txt}{space 8}d_dist154 {c |}{col 19}{res}{space 2} 7.553141{col 31}{space 2} 2.190156{col 42}{space 1}    3.45{col 51}{space 3}0.001{col 59}{space 4} 3.242271{col 72}{space 3} 11.86401
{txt}{space 8}d_dist155 {c |}{col 19}{res}{space 2}  3.28041{col 31}{space 2} .0436531{col 42}{space 1}   75.15{col 51}{space 3}0.000{col 59}{space 4} 3.194488{col 72}{space 3} 3.366332
{txt}{space 8}d_dist156 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist157 {c |}{col 19}{res}{space 2}-13.29775{col 31}{space 2} .5859207{col 42}{space 1}  -22.70{col 51}{space 3}0.000{col 59}{space 4}-14.45102{col 72}{space 3}-12.14449
{txt}{space 8}d_dist158 {c |}{col 19}{res}{space 2}-57.84867{col 31}{space 2} 3.965542{col 42}{space 1}  -14.59{col 51}{space 3}0.000{col 59}{space 4}-65.65402{col 72}{space 3}-50.04332
{txt}{space 8}d_dist159 {c |}{col 19}{res}{space 2}-58.14995{col 31}{space 2} 3.833016{col 42}{space 1}  -15.17{col 51}{space 3}0.000{col 59}{space 4}-65.69445{col 72}{space 3}-50.60545
{txt}{space 8}d_dist160 {c |}{col 19}{res}{space 2} 22.06898{col 31}{space 2} .6599471{col 42}{space 1}   33.44{col 51}{space 3}0.000{col 59}{space 4} 20.77001{col 72}{space 3} 23.36795
{txt}{space 8}d_dist161 {c |}{col 19}{res}{space 2}  8.23438{col 31}{space 2} .6758173{col 42}{space 1}   12.18{col 51}{space 3}0.000{col 59}{space 4} 6.904174{col 72}{space 3} 9.564587
{txt}{space 8}d_dist162 {c |}{col 19}{res}{space 2} .9006882{col 31}{space 2} .6122556{col 42}{space 1}    1.47{col 51}{space 3}0.142{col 59}{space 4}-.3044104{col 72}{space 3} 2.105787
{txt}{space 8}d_dist163 {c |}{col 19}{res}{space 2} 11.84692{col 31}{space 2} .6004009{col 42}{space 1}   19.73{col 51}{space 3}0.000{col 59}{space 4} 10.66515{col 72}{space 3} 13.02868
{txt}{space 8}d_dist164 {c |}{col 19}{res}{space 2} 3.483629{col 31}{space 2} .3639203{col 42}{space 1}    9.57{col 51}{space 3}0.000{col 59}{space 4} 2.767327{col 72}{space 3} 4.199931
{txt}{space 8}d_dist165 {c |}{col 19}{res}{space 2} 8.889766{col 31}{space 2} .8574129{col 42}{space 1}   10.37{col 51}{space 3}0.000{col 59}{space 4} 7.202125{col 72}{space 3} 10.57741
{txt}{space 8}d_dist166 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist167 {c |}{col 19}{res}{space 2} 13.55411{col 31}{space 2} .3776909{col 42}{space 1}   35.89{col 51}{space 3}0.000{col 59}{space 4} 12.81071{col 72}{space 3} 14.29752
{txt}{space 8}d_dist168 {c |}{col 19}{res}{space 2} 11.80051{col 31}{space 2} .3720768{col 42}{space 1}   31.72{col 51}{space 3}0.000{col 59}{space 4} 11.06815{col 72}{space 3} 12.53286
{txt}{space 8}d_dist169 {c |}{col 19}{res}{space 2} 40.52981{col 31}{space 2} .5826309{col 42}{space 1}   69.56{col 51}{space 3}0.000{col 59}{space 4} 39.38302{col 72}{space 3}  41.6766
{txt}{space 8}d_dist170 {c |}{col 19}{res}{space 2} 9.918881{col 31}{space 2} .3673277{col 42}{space 1}   27.00{col 51}{space 3}0.000{col 59}{space 4} 9.195872{col 72}{space 3} 10.64189
{txt}{space 8}d_dist171 {c |}{col 19}{res}{space 2} 4.700502{col 31}{space 2} .5160676{col 42}{space 1}    9.11{col 51}{space 3}0.000{col 59}{space 4}  3.68473{col 72}{space 3} 5.716275
{txt}{space 8}d_dist172 {c |}{col 19}{res}{space 2} 21.52928{col 31}{space 2} 1.143149{col 42}{space 1}   18.83{col 51}{space 3}0.000{col 59}{space 4} 19.27923{col 72}{space 3} 23.77934
{txt}{space 8}d_dist173 {c |}{col 19}{res}{space 2} 7.671181{col 31}{space 2} 1.712393{col 42}{space 1}    4.48{col 51}{space 3}0.000{col 59}{space 4} 4.300688{col 72}{space 3} 11.04167
{txt}{space 8}d_dist174 {c |}{col 19}{res}{space 2} 16.58116{col 31}{space 2} 1.341976{col 42}{space 1}   12.36{col 51}{space 3}0.000{col 59}{space 4} 13.93976{col 72}{space 3} 19.22256
{txt}{space 8}d_dist175 {c |}{col 19}{res}{space 2} 15.14361{col 31}{space 2} 1.321746{col 42}{space 1}   11.46{col 51}{space 3}0.000{col 59}{space 4} 12.54202{col 72}{space 3} 17.74519
{txt}{space 8}d_dist176 {c |}{col 19}{res}{space 2} 12.91916{col 31}{space 2}  1.25664{col 42}{space 1}   10.28{col 51}{space 3}0.000{col 59}{space 4} 10.44573{col 72}{space 3}  15.3926
{txt}{space 8}d_dist177 {c |}{col 19}{res}{space 2}  28.6831{col 31}{space 2} 1.181677{col 42}{space 1}   24.27{col 51}{space 3}0.000{col 59}{space 4} 26.35722{col 72}{space 3} 31.00899
{txt}{space 8}d_dist178 {c |}{col 19}{res}{space 2} 48.63039{col 31}{space 2} 1.200174{col 42}{space 1}   40.52{col 51}{space 3}0.000{col 59}{space 4}  46.2681{col 72}{space 3} 50.99269
{txt}{space 8}d_dist179 {c |}{col 19}{res}{space 2} 35.22619{col 31}{space 2} 1.330141{col 42}{space 1}   26.48{col 51}{space 3}0.000{col 59}{space 4} 32.60808{col 72}{space 3} 37.84429
{txt}{space 8}d_dist180 {c |}{col 19}{res}{space 2} 32.64306{col 31}{space 2} 1.158424{col 42}{space 1}   28.18{col 51}{space 3}0.000{col 59}{space 4} 30.36294{col 72}{space 3} 34.92318
{txt}{space 8}d_dist181 {c |}{col 19}{res}{space 2} 34.71656{col 31}{space 2} 1.201464{col 42}{space 1}   28.90{col 51}{space 3}0.000{col 59}{space 4} 32.35173{col 72}{space 3} 37.08139
{txt}{space 8}d_dist182 {c |}{col 19}{res}{space 2} 45.37227{col 31}{space 2} 1.163582{col 42}{space 1}   38.99{col 51}{space 3}0.000{col 59}{space 4}   43.082{col 72}{space 3} 47.66255
{txt}{space 8}d_dist183 {c |}{col 19}{res}{space 2} 47.34043{col 31}{space 2} 1.860683{col 42}{space 1}   25.44{col 51}{space 3}0.000{col 59}{space 4} 43.67806{col 72}{space 3}  51.0028
{txt}{space 8}d_dist184 {c |}{col 19}{res}{space 2} 43.55979{col 31}{space 2} 1.170404{col 42}{space 1}   37.22{col 51}{space 3}0.000{col 59}{space 4}  41.2561{col 72}{space 3} 45.86349
{txt}{space 8}d_dist185 {c |}{col 19}{res}{space 2} 7.281697{col 31}{space 2} 1.349611{col 42}{space 1}    5.40{col 51}{space 3}0.000{col 59}{space 4} 4.625268{col 72}{space 3} 9.938127
{txt}{space 8}d_dist186 {c |}{col 19}{res}{space 2} 33.45806{col 31}{space 2} 1.436044{col 42}{space 1}   23.30{col 51}{space 3}0.000{col 59}{space 4}  30.6315{col 72}{space 3} 36.28461
{txt}{space 8}d_dist187 {c |}{col 19}{res}{space 2} 44.45306{col 31}{space 2} 1.436044{col 42}{space 1}   30.96{col 51}{space 3}0.000{col 59}{space 4}  41.6265{col 72}{space 3} 47.27961
{txt}{space 8}d_dist188 {c |}{col 19}{res}{space 2} 48.31806{col 31}{space 2} 1.436044{col 42}{space 1}   33.65{col 51}{space 3}0.000{col 59}{space 4}  45.4915{col 72}{space 3} 51.14461
{txt}{space 8}d_dist189 {c |}{col 19}{res}{space 2} 29.99969{col 31}{space 2} 1.337033{col 42}{space 1}   22.44{col 51}{space 3}0.000{col 59}{space 4} 27.36802{col 72}{space 3} 32.63136
{txt}{space 8}d_dist190 {c |}{col 19}{res}{space 2} 20.09891{col 31}{space 2}  1.25636{col 42}{space 1}   16.00{col 51}{space 3}0.000{col 59}{space 4} 17.62602{col 72}{space 3} 22.57179
{txt}{space 8}d_dist191 {c |}{col 19}{res}{space 2} 7.594085{col 31}{space 2} 1.211058{col 42}{space 1}    6.27{col 51}{space 3}0.000{col 59}{space 4} 5.210368{col 72}{space 3} 9.977802
{txt}{space 8}d_dist192 {c |}{col 19}{res}{space 2} 5.290837{col 31}{space 2} 1.346656{col 42}{space 1}    3.93{col 51}{space 3}0.000{col 59}{space 4} 2.640224{col 72}{space 3} 7.941451
{txt}{space 8}d_dist193 {c |}{col 19}{res}{space 2} 21.77594{col 31}{space 2} 1.330614{col 42}{space 1}   16.37{col 51}{space 3}0.000{col 59}{space 4} 19.15691{col 72}{space 3} 24.39498
{txt}{space 8}d_dist194 {c |}{col 19}{res}{space 2}  23.9719{col 31}{space 2} 1.302086{col 42}{space 1}   18.41{col 51}{space 3}0.000{col 59}{space 4} 21.40901{col 72}{space 3} 26.53479
{txt}{space 8}d_dist195 {c |}{col 19}{res}{space 2} 15.82957{col 31}{space 2} 1.994912{col 42}{space 1}    7.93{col 51}{space 3}0.000{col 59}{space 4}   11.903{col 72}{space 3} 19.75614
{txt}{space 8}d_dist196 {c |}{col 19}{res}{space 2}  7.10619{col 31}{space 2} 1.869749{col 42}{space 1}    3.80{col 51}{space 3}0.000{col 59}{space 4} 3.425977{col 72}{space 3}  10.7864
{txt}{space 8}d_dist197 {c |}{col 19}{res}{space 2}  19.0959{col 31}{space 2} 1.349427{col 42}{space 1}   14.15{col 51}{space 3}0.000{col 59}{space 4} 16.43983{col 72}{space 3} 21.75197
{txt}{space 8}d_dist198 {c |}{col 19}{res}{space 2} 2.866113{col 31}{space 2} 1.182965{col 42}{space 1}    2.42{col 51}{space 3}0.016{col 59}{space 4} .5376902{col 72}{space 3} 5.194536
{txt}{space 8}d_dist199 {c |}{col 19}{res}{space 2}   24.408{col 31}{space 2} 1.200679{col 42}{space 1}   20.33{col 51}{space 3}0.000{col 59}{space 4} 22.04471{col 72}{space 3} 26.77129
{txt}{space 8}d_dist200 {c |}{col 19}{res}{space 2} 23.68665{col 31}{space 2} 1.623554{col 42}{space 1}   14.59{col 51}{space 3}0.000{col 59}{space 4} 20.49102{col 72}{space 3} 26.88229
{txt}{space 8}d_dist201 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist202 {c |}{col 19}{res}{space 2} 12.73453{col 31}{space 2} .4764615{col 42}{space 1}   26.73{col 51}{space 3}0.000{col 59}{space 4} 11.79672{col 72}{space 3} 13.67235
{txt}{space 8}d_dist203 {c |}{col 19}{res}{space 2} 1.108101{col 31}{space 2} .4991752{col 42}{space 1}    2.22{col 51}{space 3}0.027{col 59}{space 4} .1255773{col 72}{space 3} 2.090624
{txt}{space 8}d_dist204 {c |}{col 19}{res}{space 2} 8.564759{col 31}{space 2} .7849438{col 42}{space 1}   10.91{col 51}{space 3}0.000{col 59}{space 4} 7.019759{col 72}{space 3} 10.10976
{txt}{space 8}d_dist205 {c |}{col 19}{res}{space 2} 1.895137{col 31}{space 2} .5150234{col 42}{space 1}    3.68{col 51}{space 3}0.000{col 59}{space 4} .8814198{col 72}{space 3} 2.908854
{txt}{space 8}d_dist206 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist207 {c |}{col 19}{res}{space 2} 11.04298{col 31}{space 2} .5128236{col 42}{space 1}   21.53{col 51}{space 3}0.000{col 59}{space 4} 10.03359{col 72}{space 3} 12.05237
{txt}{space 8}d_dist208 {c |}{col 19}{res}{space 2} 6.475577{col 31}{space 2} .4764645{col 42}{space 1}   13.59{col 51}{space 3}0.000{col 59}{space 4} 5.537755{col 72}{space 3} 7.413399
{txt}{space 8}d_dist209 {c |}{col 19}{res}{space 2}-9.259705{col 31}{space 2} .4972219{col 42}{space 1}  -18.62{col 51}{space 3}0.000{col 59}{space 4}-10.23838{col 72}{space 3}-8.281027
{txt}{space 8}d_dist210 {c |}{col 19}{res}{space 2} 6.802637{col 31}{space 2} .5150234{col 42}{space 1}   13.21{col 51}{space 3}0.000{col 59}{space 4}  5.78892{col 72}{space 3} 7.816354
{txt}{space 8}d_dist211 {c |}{col 19}{res}{space 2} 3.074485{col 31}{space 2} .0493746{col 42}{space 1}   62.27{col 51}{space 3}0.000{col 59}{space 4} 2.977301{col 72}{space 3} 3.171669
{txt}{space 8}d_dist212 {c |}{col 19}{res}{space 2}-6.208804{col 31}{space 2} .5754925{col 42}{space 1}  -10.79{col 51}{space 3}0.000{col 59}{space 4}-7.341542{col 72}{space 3}-5.076066
{txt}{space 8}d_dist213 {c |}{col 19}{res}{space 2} 7.132237{col 31}{space 2} .5101922{col 42}{space 1}   13.98{col 51}{space 3}0.000{col 59}{space 4}  6.12803{col 72}{space 3} 8.136445
{txt}{space 8}d_dist214 {c |}{col 19}{res}{space 2} .4740999{col 31}{space 2}  .511036{col 42}{space 1}    0.93{col 51}{space 3}0.354{col 59}{space 4}-.5317687{col 72}{space 3} 1.479969
{txt}{space 8}d_dist215 {c |}{col 19}{res}{space 2} 3.064901{col 31}{space 2} 1.200389{col 42}{space 1}    2.55{col 51}{space 3}0.011{col 59}{space 4} .7021837{col 72}{space 3} 5.427618
{txt}{space 8}d_dist216 {c |}{col 19}{res}{space 2} 12.72416{col 31}{space 2} 1.370717{col 42}{space 1}    9.28{col 51}{space 3}0.000{col 59}{space 4} 10.02619{col 72}{space 3} 15.42214
{txt}{space 8}d_dist217 {c |}{col 19}{res}{space 2} 12.46378{col 31}{space 2} .5886802{col 42}{space 1}   21.17{col 51}{space 3}0.000{col 59}{space 4} 11.30508{col 72}{space 3} 13.62247
{txt}{space 8}d_dist218 {c |}{col 19}{res}{space 2} 14.49798{col 31}{space 2} .6957457{col 42}{space 1}   20.84{col 51}{space 3}0.000{col 59}{space 4} 13.12855{col 72}{space 3} 15.86741
{txt}{space 8}d_dist219 {c |}{col 19}{res}{space 2} 13.86392{col 31}{space 2} .4600866{col 42}{space 1}   30.13{col 51}{space 3}0.000{col 59}{space 4} 12.95833{col 72}{space 3}  14.7695
{txt}{space 8}d_dist220 {c |}{col 19}{res}{space 2} 20.71979{col 31}{space 2} 1.415064{col 42}{space 1}   14.64{col 51}{space 3}0.000{col 59}{space 4} 17.93453{col 72}{space 3} 23.50505
{txt}{space 8}d_dist221 {c |}{col 19}{res}{space 2}  12.8331{col 31}{space 2} .2474806{col 42}{space 1}   51.85{col 51}{space 3}0.000{col 59}{space 4} 12.34599{col 72}{space 3} 13.32022
{txt}{space 8}d_dist222 {c |}{col 19}{res}{space 2} 16.28987{col 31}{space 2} .3998993{col 42}{space 1}   40.73{col 51}{space 3}0.000{col 59}{space 4} 15.50275{col 72}{space 3} 17.07699
{txt}{space 8}d_dist223 {c |}{col 19}{res}{space 2} 17.53221{col 31}{space 2}  .632555{col 42}{space 1}   27.72{col 51}{space 3}0.000{col 59}{space 4} 16.28716{col 72}{space 3} 18.77726
{txt}{space 8}d_dist224 {c |}{col 19}{res}{space 2} 10.30471{col 31}{space 2} .4190554{col 42}{space 1}   24.59{col 51}{space 3}0.000{col 59}{space 4} 9.479882{col 72}{space 3} 11.12953
{txt}{space 8}d_dist225 {c |}{col 19}{res}{space 2} 37.64085{col 31}{space 2}   .02734{col 42}{space 1} 1376.77{col 51}{space 3}0.000{col 59}{space 4} 37.58704{col 72}{space 3} 37.69467
{txt}{space 8}d_dist226 {c |}{col 19}{res}{space 2} 7.609799{col 31}{space 2} .4791806{col 42}{space 1}   15.88{col 51}{space 3}0.000{col 59}{space 4} 6.666631{col 72}{space 3} 8.552967
{txt}{space 8}d_dist227 {c |}{col 19}{res}{space 2} 11.66405{col 31}{space 2} .6963862{col 42}{space 1}   16.75{col 51}{space 3}0.000{col 59}{space 4} 10.29336{col 72}{space 3} 13.03474
{txt}{space 8}d_dist228 {c |}{col 19}{res}{space 2}  11.6082{col 31}{space 2} .4180413{col 42}{space 1}   27.77{col 51}{space 3}0.000{col 59}{space 4} 10.78537{col 72}{space 3} 12.43103
{txt}{space 8}d_dist229 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist230 {c |}{col 19}{res}{space 2} 5.395367{col 31}{space 2} .2587288{col 42}{space 1}   20.85{col 51}{space 3}0.000{col 59}{space 4} 4.886113{col 72}{space 3} 5.904621
{txt}{space 8}d_dist231 {c |}{col 19}{res}{space 2} 24.60721{col 31}{space 2} .8664894{col 42}{space 1}   28.40{col 51}{space 3}0.000{col 59}{space 4} 22.90171{col 72}{space 3} 26.31272
{txt}{space 8}d_dist232 {c |}{col 19}{res}{space 2} 5.933998{col 31}{space 2}  1.24356{col 42}{space 1}    4.77{col 51}{space 3}0.000{col 59}{space 4} 3.486307{col 72}{space 3} 8.381688
{txt}{space 8}d_dist233 {c |}{col 19}{res}{space 2} 4.382519{col 31}{space 2} 3.223934{col 42}{space 1}    1.36{col 51}{space 3}0.175{col 59}{space 4}-1.963129{col 72}{space 3} 10.72817
{txt}{space 8}d_dist234 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist235 {c |}{col 19}{res}{space 2} 11.50519{col 31}{space 2} 4.565891{col 42}{space 1}    2.52{col 51}{space 3}0.012{col 59}{space 4} 2.518179{col 72}{space 3}  20.4922
{txt}{space 8}d_dist236 {c |}{col 19}{res}{space 2} 14.09242{col 31}{space 2} 3.409466{col 42}{space 1}    4.13{col 51}{space 3}0.000{col 59}{space 4}  7.38159{col 72}{space 3} 20.80325
{txt}{space 8}d_dist237 {c |}{col 19}{res}{space 2}-3.887824{col 31}{space 2} 7.702162{col 42}{space 1}   -0.50{col 51}{space 3}0.614{col 59}{space 4}-19.04794{col 72}{space 3} 11.27229
{txt}{space 8}d_dist238 {c |}{col 19}{res}{space 2}-5.761513{col 31}{space 2} 4.398505{col 42}{space 1}   -1.31{col 51}{space 3}0.191{col 59}{space 4}-14.41906{col 72}{space 3} 2.896034
{txt}{space 8}d_dist239 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist240 {c |}{col 19}{res}{space 2}-.8091009{col 31}{space 2} 4.507593{col 42}{space 1}   -0.18{col 51}{space 3}0.858{col 59}{space 4}-9.681366{col 72}{space 3} 8.063164
{txt}{space 8}d_dist241 {c |}{col 19}{res}{space 2} -6.30102{col 31}{space 2} 4.406857{col 42}{space 1}   -1.43{col 51}{space 3}0.154{col 59}{space 4}-14.97501{col 72}{space 3} 2.372968
{txt}{space 8}d_dist242 {c |}{col 19}{res}{space 2}-16.95447{col 31}{space 2} 4.855769{col 42}{space 1}   -3.49{col 51}{space 3}0.001{col 59}{space 4}-26.51205{col 72}{space 3}-7.396892
{txt}{space 8}d_dist243 {c |}{col 19}{res}{space 2} 18.20784{col 31}{space 2} .6442532{col 42}{space 1}   28.26{col 51}{space 3}0.000{col 59}{space 4} 16.93976{col 72}{space 3} 19.47592
{txt}{space 8}d_dist244 {c |}{col 19}{res}{space 2} 13.29778{col 31}{space 2} .7867009{col 42}{space 1}   16.90{col 51}{space 3}0.000{col 59}{space 4} 11.74932{col 72}{space 3} 14.84624
{txt}{space 8}d_dist245 {c |}{col 19}{res}{space 2}-24.17606{col 31}{space 2} .6276624{col 42}{space 1}  -38.52{col 51}{space 3}0.000{col 59}{space 4}-25.41149{col 72}{space 3}-22.94064
{txt}{space 8}d_dist246 {c |}{col 19}{res}{space 2}-21.41803{col 31}{space 2} .6941143{col 42}{space 1}  -30.86{col 51}{space 3}0.000{col 59}{space 4}-22.78425{col 72}{space 3}-20.05181
{txt}{space 8}d_dist247 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist248 {c |}{col 19}{res}{space 2}-23.61728{col 31}{space 2} .5979567{col 42}{space 1}  -39.50{col 51}{space 3}0.000{col 59}{space 4}-24.79423{col 72}{space 3}-22.44032
{txt}{space 8}d_dist249 {c |}{col 19}{res}{space 2}-23.82462{col 31}{space 2} .9836665{col 42}{space 1}  -24.22{col 51}{space 3}0.000{col 59}{space 4}-25.76077{col 72}{space 3}-21.88848
{txt}{space 8}d_dist250 {c |}{col 19}{res}{space 2}-19.65002{col 31}{space 2} 1.980558{col 42}{space 1}   -9.92{col 51}{space 3}0.000{col 59}{space 4}-23.54834{col 72}{space 3} -15.7517
{txt}{space 8}d_dist251 {c |}{col 19}{res}{space 2}-9.219164{col 31}{space 2} .7634603{col 42}{space 1}  -12.08{col 51}{space 3}0.000{col 59}{space 4}-10.72188{col 72}{space 3}-7.716451
{txt}{space 8}d_dist252 {c |}{col 19}{res}{space 2}-13.90879{col 31}{space 2} .6734595{col 42}{space 1}  -20.65{col 51}{space 3}0.000{col 59}{space 4}-15.23435{col 72}{space 3}-12.58322
{txt}{space 8}d_dist253 {c |}{col 19}{res}{space 2} -8.85993{col 31}{space 2} .6018027{col 42}{space 1}  -14.72{col 51}{space 3}0.000{col 59}{space 4}-10.04445{col 72}{space 3}-7.675406
{txt}{space 8}d_dist254 {c |}{col 19}{res}{space 2}-8.807728{col 31}{space 2} .6122261{col 42}{space 1}  -14.39{col 51}{space 3}0.000{col 59}{space 4}-10.01277{col 72}{space 3}-7.602688
{txt}{space 8}d_dist255 {c |}{col 19}{res}{space 2}-10.13723{col 31}{space 2} 1.934427{col 42}{space 1}   -5.24{col 51}{space 3}0.000{col 59}{space 4}-13.94475{col 72}{space 3}-6.329706
{txt}{space 8}d_dist256 {c |}{col 19}{res}{space 2} 16.59289{col 31}{space 2} .6363579{col 42}{space 1}   26.07{col 51}{space 3}0.000{col 59}{space 4} 15.34035{col 72}{space 3} 17.84543
{txt}{space 8}d_dist257 {c |}{col 19}{res}{space 2}-15.38262{col 31}{space 2} 1.915736{col 42}{space 1}   -8.03{col 51}{space 3}0.000{col 59}{space 4}-19.15335{col 72}{space 3}-11.61189
{txt}{space 8}d_dist258 {c |}{col 19}{res}{space 2}-14.72367{col 31}{space 2} .7838437{col 42}{space 1}  -18.78{col 51}{space 3}0.000{col 59}{space 4} -16.2665{col 72}{space 3}-13.18083
{txt}{space 8}d_dist259 {c |}{col 19}{res}{space 2}-15.30056{col 31}{space 2}  .602978{col 42}{space 1}  -25.37{col 51}{space 3}0.000{col 59}{space 4} -16.4874{col 72}{space 3}-14.11372
{txt}{space 8}d_dist260 {c |}{col 19}{res}{space 2}-13.12252{col 31}{space 2} .6452657{col 42}{space 1}  -20.34{col 51}{space 3}0.000{col 59}{space 4}-14.39259{col 72}{space 3}-11.85245
{txt}{space 8}d_dist261 {c |}{col 19}{res}{space 2} .3413634{col 31}{space 2}  .702114{col 42}{space 1}    0.49{col 51}{space 3}0.627{col 59}{space 4}-1.040603{col 72}{space 3}  1.72333
{txt}{space 8}d_dist262 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist263 {c |}{col 19}{res}{space 2}-1.368118{col 31}{space 2} 2.909986{col 42}{space 1}   -0.47{col 51}{space 3}0.639{col 59}{space 4}-7.095823{col 72}{space 3} 4.359587
{txt}{space 8}d_dist264 {c |}{col 19}{res}{space 2}-15.49169{col 31}{space 2} 4.000382{col 42}{space 1}   -3.87{col 51}{space 3}0.000{col 59}{space 4}-23.36561{col 72}{space 3}-7.617764
{txt}{space 8}d_dist265 {c |}{col 19}{res}{space 2}-25.82969{col 31}{space 2} 2.909858{col 42}{space 1}   -8.88{col 51}{space 3}0.000{col 59}{space 4}-31.55714{col 72}{space 3}-20.10223
{txt}{space 8}d_dist266 {c |}{col 19}{res}{space 2}-15.23467{col 31}{space 2} 2.910571{col 42}{space 1}   -5.23{col 51}{space 3}0.000{col 59}{space 4}-20.96352{col 72}{space 3} -9.50581
{txt}{space 8}d_dist267 {c |}{col 19}{res}{space 2}-5.561006{col 31}{space 2} 3.998514{col 42}{space 1}   -1.39{col 51}{space 3}0.165{col 59}{space 4}-13.43125{col 72}{space 3} 2.309242
{txt}{space 8}d_dist268 {c |}{col 19}{res}{space 2}-3.999669{col 31}{space 2} 2.910571{col 42}{space 1}   -1.37{col 51}{space 3}0.170{col 59}{space 4}-9.728527{col 72}{space 3} 1.729188
{txt}{space 8}d_dist269 {c |}{col 19}{res}{space 2}  -.99128{col 31}{space 2} 3.998238{col 42}{space 1}   -0.25{col 51}{space 3}0.804{col 59}{space 4}-8.860984{col 72}{space 3} 6.878424
{txt}{space 8}d_dist270 {c |}{col 19}{res}{space 2} 3.267342{col 31}{space 2} 2.425776{col 42}{space 1}    1.35{col 51}{space 3}0.179{col 59}{space 4}-1.507296{col 72}{space 3} 8.041981
{txt}{space 8}d_dist271 {c |}{col 19}{res}{space 2} .6372519{col 31}{space 2} 2.358844{col 42}{space 1}    0.27{col 51}{space 3}0.787{col 59}{space 4}-4.005645{col 72}{space 3} 5.280149
{txt}{space 8}d_dist272 {c |}{col 19}{res}{space 2}-3.283534{col 31}{space 2} 2.454651{col 42}{space 1}   -1.34{col 51}{space 3}0.182{col 59}{space 4}-8.115007{col 72}{space 3} 1.547939
{txt}{space 8}d_dist273 {c |}{col 19}{res}{space 2} -1.44462{col 31}{space 2} 2.782203{col 42}{space 1}   -0.52{col 51}{space 3}0.604{col 59}{space 4}-6.920812{col 72}{space 3} 4.031573
{txt}{space 8}d_dist274 {c |}{col 19}{res}{space 2}  1.02585{col 31}{space 2} .7766178{col 42}{space 1}    1.32{col 51}{space 3}0.188{col 59}{space 4}-.5027621{col 72}{space 3} 2.554461
{txt}{space 8}d_dist275 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 8}d_dist276 {c |}{col 19}{res}{space 2}  2.15874{col 31}{space 2} 2.416453{col 42}{space 1}    0.89{col 51}{space 3}0.372{col 59}{space 4}-2.597548{col 72}{space 3} 6.915029
{txt}{space 8}d_dist277 {c |}{col 19}{res}{space 2} 23.11066{col 31}{space 2} 2.388686{col 42}{space 1}    9.68{col 51}{space 3}0.000{col 59}{space 4} 18.40903{col 72}{space 3}  27.8123
{txt}{space 8}d_dist278 {c |}{col 19}{res}{space 2}-12.39318{col 31}{space 2} 2.718028{col 42}{space 1}   -4.56{col 51}{space 3}0.000{col 59}{space 4}-17.74305{col 72}{space 3}-7.043301
{txt}{space 8}d_dist279 {c |}{col 19}{res}{space 2}-.7778236{col 31}{space 2} 2.359585{col 42}{space 1}   -0.33{col 51}{space 3}0.742{col 59}{space 4}-5.422179{col 72}{space 3} 3.866532
{txt}{space 8}d_dist280 {c |}{col 19}{res}{space 2}  5.73793{col 31}{space 2} 3.034727{col 42}{space 1}    1.89{col 51}{space 3}0.060{col 59}{space 4}-.2353026{col 72}{space 3} 11.71116
{txt}{space 8}d_dist281 {c |}{col 19}{res}{space 2} 4.273922{col 31}{space 2} 2.997161{col 42}{space 1}    1.43{col 51}{space 3}0.155{col 59}{space 4} -1.62537{col 72}{space 3} 10.17321
{txt}{space 8}d_dist282 {c |}{col 19}{res}{space 2}-.0056342{col 31}{space 2}  2.89515{col 42}{space 1}   -0.00{col 51}{space 3}0.998{col 59}{space 4}-5.704139{col 72}{space 3} 5.692871
{txt}{space 8}d_dist283 {c |}{col 19}{res}{space 2} 21.48478{col 31}{space 2} 4.709976{col 42}{space 1}    4.56{col 51}{space 3}0.000{col 59}{space 4} 12.21416{col 72}{space 3} 30.75539
{txt}{space 8}d_dist284 {c |}{col 19}{res}{space 2} 15.55496{col 31}{space 2} 3.017862{col 42}{space 1}    5.15{col 51}{space 3}0.000{col 59}{space 4} 9.614924{col 72}{space 3}   21.495
{txt}{space 8}d_dist285 {c |}{col 19}{res}{space 2}  16.5819{col 31}{space 2} 2.877412{col 42}{space 1}    5.76{col 51}{space 3}0.000{col 59}{space 4} 10.91831{col 72}{space 3} 22.24549
{txt}{space 8}d_dist286 {c |}{col 19}{res}{space 2} 13.48204{col 31}{space 2}  3.23163{col 42}{space 1}    4.17{col 51}{space 3}0.000{col 59}{space 4} 7.121246{col 72}{space 3} 19.84284
{txt}{space 8}d_dist287 {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (omitted)
{space 12}inter {c |}{col 19}{res}{space 2} .3373326{col 31}{space 2} .4249855{col 42}{space 1}    0.79{col 51}{space 3}0.428{col 59}{space 4}-.4991635{col 72}{space 3} 1.173829
{txt}cum_count_turbine {c |}{col 19}{res}{space 2}-.0055248{col 31}{space 2} .0059228{col 42}{space 1}   -0.93{col 51}{space 3}0.352{col 59}{space 4}-.0171825{col 72}{space 3} .0061329
{txt}{space 12}_cons {c |}{col 19}{res}{space 2} 98.88624{col 31}{space 2}  7.50318{col 42}{space 1}   13.18{col 51}{space 3}0.000{col 59}{space 4} 84.11779{col 72}{space 3} 113.6547
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{res}{txt}
{com}. 
. * Note: Coefficients on inter are around -1.0 and +0.8
. 
. 
. ** Dem
. plausexog uci demvotesmajorpercent d_sy* d_dist* (cum_capacity_turbine = inter), ///
>                                 vce(cluster district_fixed) gmin(-1) gmax(1) graph(cum_capacity_turbine) level(0.95) ///
>                             yline(0) title("Democratic Vote") xtitle("Delta") ytitle("Cumulative Capacity (MW)", size(small)) name(dem_capacity, replace) ///
>                                 scheme(myplain) legend(pos(6) row(1) label(1 "Upper Bound (UCI)") label(2 "Lower Bound (UCI)"))
Estimating Conely et al.'s uci method
Exogenous variables: d_sy1 d_sy2 d_sy3 d_sy4 d_sy5 d_sy6 d_sy7 d_sy8 d_sy9 d_sy10 d_sy11 d_sy12 d_sy13 d_sy14 d_sy15 d_sy16 d_sy17 d_sy18 d_sy19 d_sy20 d_sy21 d_sy22 d_sy23 d_sy24 d_sy25 d_sy26 d_sy27 d_sy28 d_sy29 d_sy30 d_sy31 d_sy32 d_sy33 d_sy34 d_sy35 d_sy36 d_sy37 d_sy38 d_sy39 d_sy40 d_sy41 d_sy42 d_sy43 d_sy44 d_sy45 d_sy46 d_sy47 d_sy48 d_sy49 d_sy50 d_sy51 d_sy52 d_sy53 d_sy54 d_sy55 d_sy56 d_sy57 d_sy58 d_sy59 d_sy60 d_sy61 d_sy62 d_sy63 d_sy64 d_sy65 d_sy66 d_sy67 d_sy68 d_sy69 d_sy70 d_sy71 d_sy72 d_sy73 d_sy74 d_sy75 d_sy76 d_sy77 d_sy78 d_sy79 d_sy80 d_sy81 d_sy82 d_sy83 d_sy84 d_sy85 d_sy86 d_sy87 d_sy88 d_sy89 d_sy90 d_sy91 d_sy92 d_sy93 d_sy94 d_sy95 d_sy96 d_sy97 d_sy98 d_sy99 d_sy100 d_dist1 d_dist2 d_dist3 d_dist4 d_dist5 d_dist6 d_dist7 d_dist8 d_dist9 d_dist10 d_dist11 d_dist12 d_dist13 d_dist14 d_dist15 d_dist16 d_dist17 d_dist18 d_dist19 d_dist20 d_dist21 d_dist22 d_dist23 d_dist24 d_dist25 d_dist26 d_dist27 d_dist28 d_dist29 d_dist30 d_dist31 d_dist32 d_dist33 d_dist34 d_dist35 d_dist36 d_dist37 d_dist38 d_dist39 d_dist40 d_dist41 d_dist42 d_dist43 d_dist44 d_dist45 d_dist46 d_dist47 d_dist48 d_dist49 d_dist50 d_dist51 d_dist52 d_dist53 d_dist54 d_dist55 d_dist56 d_dist57 d_dist58 d_dist59 d_dist60 d_dist61 d_dist62 d_dist63 d_dist64 d_dist65 d_dist66 d_dist67 d_dist68 d_dist69 d_dist70 d_dist71 d_dist72 d_dist73 d_dist74 d_dist75 d_dist76 d_dist77 d_dist78 d_dist79 d_dist80 d_dist81 d_dist82 d_dist83 d_dist84 d_dist85 d_dist86 d_dist87 d_dist88 d_dist89 d_dist90 d_dist91 d_dist92 d_dist93 d_dist94 d_dist95 d_dist96 d_dist97 d_dist98 d_dist99 d_dist100 d_dist101 d_dist102 d_dist103 d_dist104 d_dist105 d_dist106 d_dist107 d_dist108 d_dist109 d_dist110 d_dist111 d_dist112 d_dist113 d_dist114 d_dist115 d_dist116 d_dist117 d_dist118 d_dist119 d_dist120 d_dist121 d_dist122 d_dist123 d_dist124 d_dist125 d_dist126 d_dist127 d_dist128 d_dist129 d_dist130 d_dist131 d_dist132 d_dist133 d_dist134 d_dist135 d_dist136 d_dist137 d_dist138 d_dist139 d_dist140 d_dist141 d_dist142 d_dist143 d_dist144 d_dist145 d_dist146 d_dist147 d_dist148 d_dist149 d_dist150 d_dist151 d_dist152 d_dist153 d_dist154 d_dist155 d_dist156 d_dist157 d_dist158 d_dist159 d_dist160 d_dist161 d_dist162 d_dist163 d_dist164 d_dist165 d_dist166 d_dist167 d_dist168 d_dist169 d_dist170 d_dist171 d_dist172 d_dist173 d_dist174 d_dist175 d_dist176 d_dist177 d_dist178 d_dist179 d_dist180 d_dist181 d_dist182 d_dist183 d_dist184 d_dist185 d_dist186 d_dist187 d_dist188 d_dist189 d_dist190 d_dist191 d_dist192 d_dist193 d_dist194 d_dist195 d_dist196 d_dist197 d_dist198 d_dist199 d_dist200 d_dist201 d_dist202 d_dist203 d_dist204 d_dist205 d_dist206 d_dist207 d_dist208 d_dist209 d_dist210 d_dist211 d_dist212 d_dist213 d_dist214 d_dist215 d_dist216 d_dist217 d_dist218 d_dist219 d_dist220 d_dist221 d_dist222 d_dist223 d_dist224 d_dist225 d_dist226 d_dist227 d_dist228 d_dist229 d_dist230 d_dist231 d_dist232 d_dist233 d_dist234 d_dist235 d_dist236 d_dist237 d_dist238 d_dist239 d_dist240 d_dist241 d_dist242 d_dist243 d_dist244 d_dist245 d_dist246 d_dist247 d_dist248 d_dist249 d_dist250 d_dist251 d_dist252 d_dist253 d_dist254 d_dist255 d_dist256 d_dist257 d_dist258 d_dist259 d_dist260 d_dist261 d_dist262 d_dist263 d_dist264 d_dist265 d_dist266 d_dist267 d_dist268 d_dist269 d_dist270 d_dist271 d_dist272 d_dist273 d_dist274 d_dist275 d_dist276 d_dist277 d_dist278 d_dist279 d_dist280 d_dist281 d_dist282 d_dist283 d_dist284 d_dist285 d_dist286 d_dist287
Endogenous variables: cum_capacity_turbine
Instruments: inter
{err}Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular


Conley et al (2012)'s UCI results{col 55}Number of obs =      1144
{res}{hline 78}
Variable{col 13}Lower Bound{col 29}Upper Bound
{hline 78}
{txt}d_sy1{col 13}-4.39144{col 29}7.968326
d_sy2{col 13}8.2633611{col 29}15.158525
d_sy3{col 13}18.371912{col 29}19.802473
d_sy4{col 13}10.024891{col 29}13.015375
d_sy5{col 13}19.611176{col 29}35.465587
d_sy6{col 13}24.893896{col 29}35.178572
d_sy7{col 13}32.319468{col 29}36.887159
d_sy8{col 13}25.808921{col 29}26.608646
d_sy9{col 13}9.8361629{col 29}19.107665
d_sy10{col 13}22.783685{col 29}24.368251
d_sy11{col 13}17.048322{col 29}17.619369
d_sy12{col 13}5.4376143{col 29}10.963461
d_sy13{col 13}14.127336{col 29}29.822232
d_sy14{col 13}17.812002{col 29}27.605496
d_sy15{col 13}35.095208{col 29}38.34992
d_sy16{col 13}31.474214{col 29}34.11197
d_sy17{col 13}-26.609634{col 29}-9.3108804
d_sy18{col 13}-13.838253{col 29}-1.0250246
d_sy19{col 13}-13.3902{col 29}-6.1378256
d_sy20{col 13}-21.83607{col 29}-13.578526
d_sy21{col 13}-12.616834{col 29}-1.224195
d_sy22{col 13}-4.822633{col 29}-1.8691534
d_sy23{col 13}-2.5380118{col 29}-.0378311
d_sy24{col 13}-16.019807{col 29}-8.3714576
d_sy25{col 13}.93847007{col 29}17.59247
d_sy26{col 13}12.725766{col 29}20.709619
d_sy27{col 13}19.786045{col 29}20.045099
d_sy28{col 13}4.230382{col 29}4.5855697
d_sy29{col 13}-14.980242{col 29}-2.4326712
d_sy30{col 13}-2.3319692{col 29}2.3970453
d_sy31{col 13}-7.9742176{col 29}-7.8084452
d_sy32{col 13}-18.214287{col 29}-10.71495
d_sy33{col 13}25.616255{col 29}38.248008
d_sy34{col 13}38.477192{col 29}44.714573
d_sy35{col 13}40.452387{col 29}40.609377
d_sy36{col 13}31.227254{col 29}37.208366
d_sy37{col 13}32.178157{col 29}38.054413
d_sy38{col 13}40.911462{col 29}42.527934
d_sy39{col 13}34.6976{col 29}43.804842
d_sy40{col 13}5.7309532{col 29}22.257931
d_sy41{col 13}28.369855{col 29}41.801492
d_sy42{col 13}39.304797{col 29}44.280178
d_sy43{col 13}38.666744{col 29}41.605172
d_sy44{col 13}26.14126{col 29}37.303935
d_sy45{col 13}17.256606{col 29}29.414925
d_sy46{col 13}22.959091{col 29}27.170102
d_sy47{col 13}26.592646{col 29}26.695231
d_sy48{col 13}12.963872{col 29}18.577286
d_sy49{col 13}-16.280905{col 29}-3.0949347
d_sy50{col 13}-9.1083959{col 29}-2.6985561
d_sy51{col 13}-3.4082402{col 29}-2.5978189
d_sy52{col 13}-19.89001{col 29}-16.067716
d_sy53{col 13}-1.5840862{col 29}10.359108
d_sy54{col 13}9.7663306{col 29}15.075359
d_sy55{col 13}13.124944{col 29}14.450078
d_sy56{col 13}2.9911941{col 29}10.950494
d_sy57{col 13}-6.1583177{col 29}7.4952894
d_sy58{col 13}11.287279{col 29}18.789694
d_sy59{col 13}16.496205{col 29}18.629484
d_sy60{col 13}6.7840353{col 29}10.798688
d_sy61{col 13}31.676657{col 29}44.091573
d_sy62{col 13}39.550274{col 29}46.092991
d_sy63{col 13}40.484404{col 29}41.117324
d_sy64{col 13}30.631655{col 29}35.908533
d_sy65{col 13}-4.3446829{col 29}10.732915
d_sy66{col 13}7.787399{col 29}16.853545
d_sy67{col 13}7.9651916{col 29}11.004179
d_sy68{col 13}.80243764{col 29}3.7032337
d_sy69{col 13}12.705223{col 29}27.217479
d_sy70{col 13}20.512455{col 29}30.493324
d_sy71{col 13}22.839687{col 29}28.289167
d_sy72{col 13}15.888748{col 29}16.807344
d_sy73{col 13}1.9942768{col 29}18.950041
d_sy74{col 13}8.6191283{col 29}18.447782
d_sy75{col 13}11.885868{col 29}14.586597
d_sy76{col 13}2.6752128{col 29}7.0945179
d_sy77{col 13}-9.5182108{col 29}-1.3299038
d_sy78{col 13}4.1027177{col 29}9.4035159
d_sy79{col 13}1.8940615{col 29}1.9377158
d_sy80{col 13}-18.082847{col 29}-17.893623
d_sy81{col 13}14.100603{col 29}18.112922
d_sy82{col 13}17.261252{col 29}17.895769
d_sy83{col 13}28.240726{col 29}28.871073
d_sy84{col 13}-.79363304{col 29}6.2247065
d_sy85{col 13}-24.834858{col 29}-13.832476
d_sy86{col 13}-13.946976{col 29}-8.3225989
d_sy87{col 13}-13.457297{col 29}-12.340714
d_sy88{col 13}-22.61318{col 29}-19.358484
d_sy89{col 13}35.291838{col 29}48.969296
d_sy90{col 13}43.76505{col 29}53.342749
d_sy91{col 13}51.731596{col 29}57.209538
d_sy92{col 13}31.282587{col 29}32.66077
d_sy93{col 13}22.277915{col 29}32.51899
d_sy94{col 13}23.311719{col 29}31.315126
d_sy95{col 13}20.708388{col 29}26.282595
d_sy96{col 13}13.598973{col 29}18.479712
d_sy97{col 13}.11047029{col 29}16.527132
d_sy98{col 13}-.23978115{col 29}9.574885
d_sy99{col 13}4.4311178{col 29}10.428648
d_dist1{col 13}-4.9043299{col 29}-2.6739109
d_dist2{col 13}-12.761518{col 29}-12.508482
d_dist3{col 13}-19.382932{col 29}-17.432069
d_dist4{col 13}22.288917{col 29}25.631083
d_dist5{col 13}-2.8827848{col 29}-1.7022161
d_dist6{col 13}-33.779444{col 29}-33.495556
d_dist7{col 13}10.633362{col 29}12.64164
d_dist9{col 13}.78980064{col 29}2.3651943
d_dist10{col 13}-31.899642{col 29}-31.219982
d_dist11{col 13}-28.09248{col 29}-25.262521
d_dist12{col 13}-28.144128{col 29}-26.025873
d_dist13{col 13}6.1876707{col 29}7.6273289
d_dist14{col 13}2.0783701{col 29}5.1566315
d_dist15{col 13}8.7097025{col 29}14.470299
d_dist16{col 13}15.484578{col 29}21.195423
d_dist17{col 13}19.882758{col 29}20.057241
d_dist18{col 13}-54.226453{col 29}-4.3487708
d_dist19{col 13}-25.71941{col 29}-19.64103
d_dist20{col 13}6.7867308{col 29}10.87327
d_dist21{col 13}5.5704451{col 29}6.1695576
d_dist22{col 13}4.3372698{col 29}5.2627258
d_dist23{col 13}2.9854221{col 29}3.2745771
d_dist24{col 13}4.6304207{col 29}4.9195757
d_dist25{col 13}3.1526642{col 29}4.2873363
d_dist26{col 13}3.4798629{col 29}3.7419969
d_dist27{col 13}-42.816821{col 29}-42.72318
d_dist28{col 13}1.0579128{col 29}1.187089
d_dist29{col 13}-46.736119{col 29}-46.028881
d_dist30{col 13}-71.048742{col 29}-63.395421
d_dist31{col 13}-7.9796057{col 29}-.2253952
d_dist32{col 13}-32.04608{col 29}-27.95892
d_dist33{col 13}-33.269656{col 29}-27.652728
d_dist34{col 13}-29.196678{col 29}-24.223321
d_dist35{col 13}-4.228816{col 29}3.0088158
d_dist36{col 13}13.027719{col 29}14.687283
d_dist37{col 13}.46590805{col 29}.48409367
d_dist38{col 13}4.2301569{col 29}13.889839
d_dist39{col 13}22.127922{col 29}22.417077
d_dist40{col 13}23.902645{col 29}24.147355
d_dist41{col 13}-.46707726{col 29}-.17792225
d_dist42{col 13}7.5229225{col 29}7.8120775
d_dist43{col 13}18.552923{col 29}18.842078
d_dist44{col 13}-3.1567783{col 29}-2.6832218
d_dist45{col 13}19.480423{col 29}19.769578
d_dist46{col 13}18.428629{col 29}18.49137
d_dist47{col 13}-3.3195772{col 29}-3.0304222
d_dist48{col 13}-35.474913{col 29}-34.885087
d_dist49{col 13}-46.177179{col 29}-44.984645
d_dist50{col 13}-44.933772{col 29}-39.751228
d_dist51{col 13}-7.6747866{col 29}2.9547882
d_dist52{col 13}-28.495972{col 29}-25.179029
d_dist53{col 13}-33.528952{col 29}-31.776704
d_dist54{col 13}-30.593837{col 29}-29.156162
d_dist55{col 13}-5.5420771{col 29}-5.2529221
d_dist56{col 13}-31.353017{col 29}-30.381983
d_dist57{col 13}-34.349335{col 29}-31.665666
d_dist58{col 13}-25.989578{col 29}-25.700423
d_dist59{col 13}-4.3259735{col 29}.7909708
d_dist60{col 13}-37.949531{col 29}-33.668234
d_dist62{col 13}22.840542{col 29}27.281683
d_dist63{col 13}9.9458617{col 29}12.255054
d_dist64{col 13}-.299543{col 29}2.4200931
d_dist65{col 13}-47.308025{col 29}-7.6767395
d_dist66{col 13}-20.876493{col 29}-20.671285
d_dist67{col 13}-18.46925{col 29}-15.668527
d_dist69{col 13}3.592085{col 29}6.8472032
d_dist71{col 13}13.821921{col 29}20.86804
d_dist73{col 13}51.052716{col 29}51.695622
d_dist74{col 13}57.070907{col 29}57.787428
d_dist75{col 13}42.178407{col 29}42.894928
d_dist76{col 13}52.653405{col 29}53.369927
d_dist77{col 13}43.830286{col 29}44.699121
d_dist78{col 13}9.5001251{col 29}9.8982108
d_dist79{col 13}51.908404{col 29}52.374926
d_dist80{col 13}19.750058{col 29}21.83087
d_dist81{col 13}40.681739{col 29}40.731595
d_dist82{col 13}11.301251{col 29}11.717084
d_dist83{col 13}-.12232216{col 29}14.920348
d_dist84{col 13}43.12992{col 29}43.888417
d_dist85{col 13}6.0680829{col 29}6.3952534
d_dist86{col 13}3.5892064{col 29}10.481362
d_dist87{col 13}-11.511494{col 29}5.350152
d_dist88{col 13}-.62201602{col 29}-.258897
d_dist89{col 13}31.737915{col 29}33.260641
d_dist90{col 13}-8.9524837{col 29}-1.1719008
d_dist92{col 13}5.128076{col 29}13.596582
d_dist93{col 13}-.51176739{col 29}6.4517689
d_dist94{col 13}-17.157302{col 29}-9.7976971
d_dist95{col 13}-22.796197{col 29}-20.855608
d_dist96{col 13}-24.733528{col 29}-17.40147
d_dist97{col 13}-20.978738{col 29}-13.935897
d_dist98{col 13}4.8065217{col 29}9.3519973
d_dist99{col 13}-.62665749{col 29}2.5316572
d_dist101{col 13}-40.047033{col 29}-22.109983
d_dist102{col 13}10.432385{col 29}14.586993
d_dist103{col 13}22.902118{col 29}24.401176
d_dist105{col 13}-39.335835{col 29}-38.399162
d_dist106{col 13}-7.1736584{col 29}-6.2513399
d_dist107{col 13}-11.370583{col 29}-9.3144169
d_dist108{col 13}5.6303768{col 29}7.2546291
d_dist109{col 13}-.02926826{col 29}2.904273
d_dist110{col 13}-41.049604{col 29}-39.832684
d_dist111{col 13}6.3216019{col 29}7.5783997
d_dist113{col 13}7.0952569{col 29}17.604705
d_dist114{col 13}12.559006{col 29}22.807044
d_dist115{col 13}6.670364{col 29}14.736672
d_dist116{col 13}6.3890433{col 29}14.443488
d_dist117{col 13}3.7495875{col 29}14.707945
d_dist118{col 13}-7.8314489{col 29}-1.9499095
d_dist119{col 13}4.1782039{col 29}12.137848
d_dist120{col 13}23.526947{col 29}33.120021
d_dist121{col 13}12.178654{col 29}19.804435
d_dist123{col 13}-14.925731{col 29}-13.580965
d_dist124{col 13}-44.015889{col 29}-43.574115
d_dist125{col 13}-40.744606{col 29}-40.530397
d_dist126{col 13}-41.853628{col 29}-40.950323
d_dist127{col 13}-9.7000008{col 29}-8.3049984
d_dist128{col 13}-40.093942{col 29}-39.356061
d_dist129{col 13}-30.174129{col 29}-29.970876
d_dist130{col 13}-37.036427{col 29}-36.693575
d_dist131{col 13}-28.189721{col 29}-27.500281
d_dist132{col 13}-49.224353{col 29}-47.127103
d_dist133{col 13}-33.562222{col 29}-32.872782
d_dist134{col 13}-6.1472225{col 29}-5.4577818
d_dist135{col 13}8.8055038{col 29}9.3244915
d_dist136{col 13}10.992781{col 29}11.68222
d_dist138{col 13}-70.175449{col 29}-10.866548
d_dist139{col 13}-24.198913{col 29}-18.403552
d_dist140{col 13}-24.889359{col 29}-21.561391
d_dist141{col 13}3.840467{col 29}4.8354459
d_dist142{col 13}11.429812{col 29}13.041103
d_dist143{col 13}-19.156752{col 29}-13.021195
d_dist144{col 13}-6.6497283{col 29}1.5163397
d_dist146{col 13}50.822497{col 29}52.757506
d_dist147{col 13}4.164402{col 29}4.4305983
d_dist148{col 13}29.096969{col 29}31.48303
d_dist149{col 13}32.134485{col 29}32.865517
d_dist150{col 13}29.115488{col 29}32.049512
d_dist151{col 13}-2.9692975{col 29}4.1620591
d_dist152{col 13}.13420677{col 29}.61579275
d_dist153{col 13}-3.22998{col 29}-1.1800194
d_dist155{col 13}17.442607{col 29}20.292392
d_dist156{col 13}-11.174194{col 29}-8.5558052
d_dist158{col 13}-3.5359286{col 29}-3.3113058
d_dist160{col 13}.38647652{col 29}.63352299
d_dist161{col 13}-42.753284{col 29}-42.260127
d_dist162{col 13}-33.632096{col 29}-33.387898
d_dist163{col 13}-46.190261{col 29}-45.599738
d_dist164{col 13}-38.586645{col 29}-35.703352
d_dist165{col 13}-12.897758{col 29}-12.082237
d_dist166{col 13}-34.876132{col 29}-31.878865
d_dist167{col 13}-10.180494{col 29}-6.8645048
d_dist168{col 13}-11.860338{col 29}-8.6546564
d_dist169{col 13}18.546705{col 29}19.243299
d_dist170{col 13}-45.086234{col 29}-42.008764
d_dist171{col 13}-17.562863{col 29}-16.447133
d_dist173{col 13}6.6653759{col 29}14.911929
d_dist174{col 13}16.483869{col 29}21.988436
d_dist175{col 13}-12.324948{col 29}-7.0127498
d_dist176{col 13}13.117521{col 29}17.729779
d_dist177{col 13}29.272268{col 29}32.705038
d_dist178{col 13}49.096369{col 29}52.900934
d_dist179{col 13}36.431061{col 29}37.211243
d_dist180{col 13}33.688868{col 29}35.743433
d_dist181{col 13}35.175004{col 29}39.002296
d_dist182{col 13}46.524582{col 29}48.257721
d_dist183{col 13}46.128866{col 29}50.133436
d_dist184{col 13}44.795634{col 29}46.276666
d_dist185{col 13}2.8165285{col 29}3.865774
d_dist186{col 13}34.050934{col 29}35.746369
d_dist187{col 13}45.045933{col 29}46.741368
d_dist188{col 13}48.910932{col 29}50.606367
d_dist189{col 13}31.160932{col 29}32.006369
d_dist190{col 13}21.824114{col 29}21.828188
d_dist191{col 13}1.3533737{col 29}1.9789265
d_dist192{col 13}-1.6169288{col 29}-.44466424
d_dist193{col 13}20.821141{col 29}23.37616
d_dist194{col 13}25.362256{col 29}25.86505
d_dist195{col 13}-34.053284{col 29}-8.1803846
d_dist196{col 13}1.3323618{col 29}1.9521185
d_dist197{col 13}-8.7674663{col 29}-5.2800507
d_dist198{col 13}-4.507533{col 29}-2.9188344
d_dist199{col 13}18.376059{col 29}23.52124
d_dist200{col 13}22.873313{col 29}30.538988
d_dist202{col 13}11.966616{col 29}12.853384
d_dist203{col 13}.57801437{col 29}.74698353
d_dist204{col 13}-32.600196{col 29}-28.794806
d_dist205{col 13}1.3871899{col 29}1.437808
d_dist206{col 13}-21.468005{col 29}-20.623478
d_dist207{col 13}-32.5415{col 29}-32.518501
d_dist208{col 13}5.7195339{col 29}6.570466
d_dist209{col 13}-9.9502134{col 29}-9.7497864
d_dist210{col 13}-28.31031{col 29}-28.259691
d_dist211{col 13}-24.987402{col 29}-24.317599
d_dist212{col 13}-8.0293818{col 29}-5.6406202
d_dist213{col 13}6.6544781{col 29}6.6655207
d_dist215{col 13}-3.0562458{col 29}-2.5087528
d_dist216{col 13}-9.8478136{col 29}-9.2421851
d_dist217{col 13}-14.102444{col 29}-11.367558
d_dist218{col 13}-17.254702{col 29}-11.131044
d_dist219{col 13}-17.587984{col 29}-12.138785
d_dist220{col 13}18.65324{col 29}19.466763
d_dist221{col 13}-13.828979{col 29}-10.33602
d_dist222{col 13}-19.480244{col 29}-14.424757
d_dist223{col 13}15.645024{col 29}22.753787
d_dist224{col 13}9.403759{col 29}13.541245
d_dist225{col 13}35.909778{col 29}40.56522
d_dist226{col 13}-9.7696943{col 29}-6.2553053
d_dist227{col 13}11.050373{col 29}14.153146
d_dist228{col 13}-14.194348{col 29}-10.049544
d_dist229{col 13}-6.216598{col 29}-1.4134045
d_dist230{col 13}-7.719203{col 29}-4.2857962
d_dist231{col 13}24.693407{col 29}25.851595
d_dist233{col 13}-9.726984{col 29}-8.7230167
d_dist234{col 13}29.762502{col 29}32.142497
d_dist235{col 13}-52.79856{col 29}-18.123746
d_dist236{col 13}-23.489228{col 29}-20.15903
d_dist238{col 13}14.160229{col 29}15.994773
d_dist239{col 13}-87.488699{col 29}-25.076561
d_dist240{col 13}20.303658{col 29}20.411344
d_dist241{col 13}13.7377{col 29}15.397301
d_dist243{col 13}69.847792{col 29}72.717211
d_dist244{col 13}64.085623{col 29}68.22938
d_dist245{col 13}21.382264{col 29}22.212737
d_dist246{col 13}23.968558{col 29}27.366445
d_dist247{col 13}3.2539401{col 29}5.5559146
d_dist248{col 13}23.420668{col 29}25.044336
d_dist249{col 13}26.099312{col 29}28.365689
d_dist250{col 13}25.293959{col 29}27.796041
d_dist251{col 13}.25545213{col 29}11.192722
d_dist252{col 13}9.4699105{col 29}16.767834
d_dist253{col 13}42.010379{col 29}45.374513
d_dist254{col 13}39.367467{col 29}45.298423
d_dist255{col 13}36.712258{col 29}39.407741
d_dist256{col 13}68.302011{col 29}71.067991
d_dist257{col 13}18.016149{col 29}20.168853
d_dist258{col 13}14.628825{col 29}15.281177
d_dist259{col 13}35.081601{col 29}38.679547
d_dist260{col 13}12.508951{col 29}15.39105
d_dist262{col 13}-57.170849{col 29}-57.044152
d_dist263{col 13}-63.786768{col 29}-63.643233
d_dist264{col 13}-52.926347{col 29}-50.976404
d_dist265{col 13}-27.642212{col 29}-27.522791
d_dist266{col 13}-17.126548{col 29}-16.88845
d_dist267{col 13}-17.433357{col 29}-17.311643
d_dist268{col 13}-61.18655{col 29}-60.948452
d_dist269{col 13}-11.615351{col 29}-11.614649
d_dist271{col 13}1.3710213{col 29}1.5039816
d_dist272{col 13}-3.6857662{col 29}-.12423229
d_dist273{col 13}-5.4498424{col 29}-1.9496115
d_dist274{col 13}-69.314388{col 29}-27.012874
d_dist275{col 13}-45.952356{col 29}-24.643718
d_dist276{col 13}1.975998{col 29}4.824546
d_dist277{col 13}23.178318{col 29}25.321685
d_dist278{col 13}-17.387638{col 29}-12.377358
d_dist280{col 13}-13.336857{col 29}-7.007905
d_dist281{col 13}17.282967{col 29}22.930792
d_dist282{col 13}13.884028{col 29}14.857998
d_dist283{col 13}31.612368{col 29}36.252869
d_dist284{col 13}-22.957522{col 29}-16.922241
d_dist285{col 13}-29.226297{col 29}-22.004737
d_dist286{col 13}22.796023{col 29}24.144217
cum_capacity_turbine{col 13}-.00294888{col 29}.06222256
_cons{col 13}32.255363{col 29}46.021281
{res}{hline 78}
{err}Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
{res}{txt}
{com}. 
. plausexog uci demvotesmajorpercent d_sy* d_dist* (cum_count_turbine = inter), ///
>                                 vce(cluster district_fixed) gmin(-1) gmax(1) graph(cum_count_turbine) level(0.95) ///
>                                 yline(0) title("Democratic Vote") xtitle("Delta") ytitle("Cumulative Count", size(small)) name(dem_count, replace) ///
>                                 scheme(myplain) legend(pos(6) row(1) label(1 "Upper Bound (UCI)") label(2 "Lower Bound (UCI)"))
Estimating Conely et al.'s uci method
Exogenous variables: d_sy1 d_sy2 d_sy3 d_sy4 d_sy5 d_sy6 d_sy7 d_sy8 d_sy9 d_sy10 d_sy11 d_sy12 d_sy13 d_sy14 d_sy15 d_sy16 d_sy17 d_sy18 d_sy19 d_sy20 d_sy21 d_sy22 d_sy23 d_sy24 d_sy25 d_sy26 d_sy27 d_sy28 d_sy29 d_sy30 d_sy31 d_sy32 d_sy33 d_sy34 d_sy35 d_sy36 d_sy37 d_sy38 d_sy39 d_sy40 d_sy41 d_sy42 d_sy43 d_sy44 d_sy45 d_sy46 d_sy47 d_sy48 d_sy49 d_sy50 d_sy51 d_sy52 d_sy53 d_sy54 d_sy55 d_sy56 d_sy57 d_sy58 d_sy59 d_sy60 d_sy61 d_sy62 d_sy63 d_sy64 d_sy65 d_sy66 d_sy67 d_sy68 d_sy69 d_sy70 d_sy71 d_sy72 d_sy73 d_sy74 d_sy75 d_sy76 d_sy77 d_sy78 d_sy79 d_sy80 d_sy81 d_sy82 d_sy83 d_sy84 d_sy85 d_sy86 d_sy87 d_sy88 d_sy89 d_sy90 d_sy91 d_sy92 d_sy93 d_sy94 d_sy95 d_sy96 d_sy97 d_sy98 d_sy99 d_sy100 d_dist1 d_dist2 d_dist3 d_dist4 d_dist5 d_dist6 d_dist7 d_dist8 d_dist9 d_dist10 d_dist11 d_dist12 d_dist13 d_dist14 d_dist15 d_dist16 d_dist17 d_dist18 d_dist19 d_dist20 d_dist21 d_dist22 d_dist23 d_dist24 d_dist25 d_dist26 d_dist27 d_dist28 d_dist29 d_dist30 d_dist31 d_dist32 d_dist33 d_dist34 d_dist35 d_dist36 d_dist37 d_dist38 d_dist39 d_dist40 d_dist41 d_dist42 d_dist43 d_dist44 d_dist45 d_dist46 d_dist47 d_dist48 d_dist49 d_dist50 d_dist51 d_dist52 d_dist53 d_dist54 d_dist55 d_dist56 d_dist57 d_dist58 d_dist59 d_dist60 d_dist61 d_dist62 d_dist63 d_dist64 d_dist65 d_dist66 d_dist67 d_dist68 d_dist69 d_dist70 d_dist71 d_dist72 d_dist73 d_dist74 d_dist75 d_dist76 d_dist77 d_dist78 d_dist79 d_dist80 d_dist81 d_dist82 d_dist83 d_dist84 d_dist85 d_dist86 d_dist87 d_dist88 d_dist89 d_dist90 d_dist91 d_dist92 d_dist93 d_dist94 d_dist95 d_dist96 d_dist97 d_dist98 d_dist99 d_dist100 d_dist101 d_dist102 d_dist103 d_dist104 d_dist105 d_dist106 d_dist107 d_dist108 d_dist109 d_dist110 d_dist111 d_dist112 d_dist113 d_dist114 d_dist115 d_dist116 d_dist117 d_dist118 d_dist119 d_dist120 d_dist121 d_dist122 d_dist123 d_dist124 d_dist125 d_dist126 d_dist127 d_dist128 d_dist129 d_dist130 d_dist131 d_dist132 d_dist133 d_dist134 d_dist135 d_dist136 d_dist137 d_dist138 d_dist139 d_dist140 d_dist141 d_dist142 d_dist143 d_dist144 d_dist145 d_dist146 d_dist147 d_dist148 d_dist149 d_dist150 d_dist151 d_dist152 d_dist153 d_dist154 d_dist155 d_dist156 d_dist157 d_dist158 d_dist159 d_dist160 d_dist161 d_dist162 d_dist163 d_dist164 d_dist165 d_dist166 d_dist167 d_dist168 d_dist169 d_dist170 d_dist171 d_dist172 d_dist173 d_dist174 d_dist175 d_dist176 d_dist177 d_dist178 d_dist179 d_dist180 d_dist181 d_dist182 d_dist183 d_dist184 d_dist185 d_dist186 d_dist187 d_dist188 d_dist189 d_dist190 d_dist191 d_dist192 d_dist193 d_dist194 d_dist195 d_dist196 d_dist197 d_dist198 d_dist199 d_dist200 d_dist201 d_dist202 d_dist203 d_dist204 d_dist205 d_dist206 d_dist207 d_dist208 d_dist209 d_dist210 d_dist211 d_dist212 d_dist213 d_dist214 d_dist215 d_dist216 d_dist217 d_dist218 d_dist219 d_dist220 d_dist221 d_dist222 d_dist223 d_dist224 d_dist225 d_dist226 d_dist227 d_dist228 d_dist229 d_dist230 d_dist231 d_dist232 d_dist233 d_dist234 d_dist235 d_dist236 d_dist237 d_dist238 d_dist239 d_dist240 d_dist241 d_dist242 d_dist243 d_dist244 d_dist245 d_dist246 d_dist247 d_dist248 d_dist249 d_dist250 d_dist251 d_dist252 d_dist253 d_dist254 d_dist255 d_dist256 d_dist257 d_dist258 d_dist259 d_dist260 d_dist261 d_dist262 d_dist263 d_dist264 d_dist265 d_dist266 d_dist267 d_dist268 d_dist269 d_dist270 d_dist271 d_dist272 d_dist273 d_dist274 d_dist275 d_dist276 d_dist277 d_dist278 d_dist279 d_dist280 d_dist281 d_dist282 d_dist283 d_dist284 d_dist285 d_dist286 d_dist287
Endogenous variables: cum_count_turbine
Instruments: inter
{err}Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular


Conley et al (2012)'s UCI results{col 55}Number of obs =      1144
{res}{hline 78}
Variable{col 13}Lower Bound{col 29}Upper Bound
{hline 78}
{txt}d_sy1{col 13}-2.3677277{col 29}7.8724174
d_sy2{col 13}10.287073{col 29}15.062617
d_sy3{col 13}19.706564{col 29}20.395625
d_sy4{col 13}9.9193447{col 29}15.242438
d_sy5{col 13}21.80656{col 29}35.361543
d_sy6{col 13}26.913834{col 29}35.082842
d_sy7{col 13}34.356953{col 29}36.790597
d_sy8{col 13}25.711985{col 29}28.654039
d_sy9{col 13}12.772174{col 29}18.968521
d_sy10{col 13}24.233355{col 29}25.630064
d_sy11{col 13}17.574019{col 29}18.005226
d_sy12{col 13}5.3780778{col 29}12.219706
d_sy13{col 13}12.497891{col 29}29.899455
d_sy14{col 13}15.572459{col 29}27.711634
d_sy15{col 13}32.781013{col 29}38.459596
d_sy16{col 13}31.544642{col 29}31.595886
d_sy17{col 13}-24.925098{col 29}-9.3907146
d_sy18{col 13}-12.420329{col 29}-1.0922234
d_sy19{col 13}-11.705586{col 29}-6.2176635
d_sy20{col 13}-20.271738{col 29}-13.652663
d_sy21{col 13}-10.478263{col 29}-1.325547
d_sy22{col 13}-2.689756{col 29}-1.9702356
d_sy23{col 13}-2.6356822{col 29}2.0230564
d_sy24{col 13}-16.1107{col 29}-6.4535908
d_sy25{col 13}3.037509{col 29}17.492992
d_sy26{col 13}14.824805{col 29}20.61014
d_sy27{col 13}19.951037{col 29}21.770784
d_sy28{col 13}4.4853166{col 29}6.3457657
d_sy29{col 13}-14.218806{col 29}-2.4687575
d_sy30{col 13}-2.0157769{col 29}2.3820602
d_sy31{col 13}-7.8818555{col 29}-6.4252293
d_sy32{col 13}-18.331452{col 29}-8.2427213
d_sy33{col 13}27.645692{col 29}38.151828
d_sy34{col 13}40.506629{col 29}44.618393
d_sy35{col 13}40.356207{col 29}42.638814
d_sy36{col 13}31.122522{col 29}39.418256
d_sy37{col 13}34.090421{col 29}37.963786
d_sy38{col 13}40.821559{col 29}44.424927
d_sy39{col 13}34.608825{col 29}45.678031
d_sy40{col 13}5.6474852{col 29}24.019142
d_sy41{col 13}30.457672{col 29}41.702545
d_sy42{col 13}41.379903{col 29}44.181834
d_sy43{col 13}38.569759{col 29}43.651609
d_sy44{col 13}26.042265{col 29}39.392775
d_sy45{col 13}19.660248{col 29}29.30101
d_sy46{col 13}25.361223{col 29}27.05626
d_sy47{col 13}26.589505{col 29}28.823506
d_sy48{col 13}12.855214{col 29}20.870013
d_sy49{col 13}-14.323487{col 29}-3.1877015
d_sy50{col 13}-7.1509778{col 29}-2.7913228
d_sy51{col 13}-2.7005659{col 29}-1.2402337
d_sy52{col 13}-19.995001{col 29}-13.852359
d_sy53{col 13}.4904639{col 29}10.26079
d_sy54{col 13}11.840881{col 29}14.977041
d_sy55{col 13}13.026626{col 29}16.524628
d_sy56{col 13}2.8928762{col 29}13.025044
d_sy57{col 13}-4.0346493{col 29}7.3946436
d_sy58{col 13}13.410947{col 29}18.689049
d_sy59{col 13}18.523024{col 29}18.742554
d_sy60{col 13}6.6798923{col 29}12.996148
d_sy61{col 13}33.754284{col 29}43.993109
d_sy62{col 13}41.623799{col 29}45.994722
d_sy63{col 13}41.019055{col 29}42.557929
d_sy64{col 13}30.533385{col 29}37.982058
d_sy65{col 13}-1.5924711{col 29}10.602481
d_sy66{col 13}10.53066{col 29}16.723535
d_sy67{col 13}10.628288{col 29}10.877968
d_sy68{col 13}.6736472{col 29}6.4207671
d_sy69{col 13}14.781653{col 29}27.119072
d_sy70{col 13}22.588886{col 29}30.394917
d_sy71{col 13}24.916117{col 29}28.19076
d_sy72{col 13}16.709293{col 29}17.957657
d_sy73{col 13}4.0822482{col 29}18.851087
d_sy74{col 13}10.7021{col 29}18.349065
d_sy75{col 13}13.96884{col 29}14.48788
d_sy76{col 13}2.5783292{col 29}9.1388038
d_sy77{col 13}-7.5369716{col 29}-1.4237995
d_sy78{col 13}5.838738{col 29}9.3212417
d_sy79{col 13}1.8500803{col 29}3.7432087
d_sy80{col 13}-18.023089{col 29}-15.351054
d_sy81{col 13}15.799419{col 29}18.032411
d_sy82{col 13}17.192568{col 29}19.345035
d_sy83{col 13}28.788231{col 29}29.988731
d_sy84{col 13}2.6084819{col 29}6.0634721
d_sy85{col 13}-22.849715{col 29}-13.926556
d_sy86{col 13}-11.948918{col 29}-8.4172917
d_sy87{col 13}-12.441412{col 29}-11.332533
d_sy88{col 13}-22.71698{col 29}-17.168248
d_sy89{col 13}37.366388{col 29}48.870978
d_sy90{col 13}45.839601{col 29}53.244432
d_sy91{col 13}53.806146{col 29}57.11122
d_sy92{col 13}32.562452{col 29}33.357137
d_sy93{col 13}23.933413{col 29}32.440532
d_sy94{col 13}24.707454{col 29}31.248979
d_sy95{col 13}22.782366{col 29}26.184304
d_sy96{col 13}16.771963{col 29}18.329336
d_sy97{col 13}.28045457{col 29}16.519076
d_sy98{col 13}-.06979687{col 29}9.566829
d_sy99{col 13}4.4649939{col 29}10.427042
d_dist1{col 13}-4.4976275{col 29}-2.6931855
d_dist2{col 13}-12.761518{col 29}-12.508482
d_dist3{col 13}-19.382932{col 29}-17.432069
d_dist4{col 13}22.288917{col 29}25.631083
d_dist5{col 13}-2.8827848{col 29}-1.7022161
d_dist6{col 13}-33.779444{col 29}-33.495556
d_dist7{col 13}10.633362{col 29}12.64164
d_dist9{col 13}.78980064{col 29}2.3651943
d_dist10{col 13}-31.920033{col 29}-30.789733
d_dist11{col 13}-28.09248{col 29}-25.262521
d_dist12{col 13}-28.144128{col 29}-26.025873
d_dist13{col 13}6.1876707{col 29}7.6273289
d_dist14{col 13}2.0783701{col 29}5.1566315
d_dist15{col 13}8.7097025{col 29}14.470299
d_dist16{col 13}15.484578{col 29}21.195423
d_dist17{col 13}19.882758{col 29}20.057241
d_dist18{col 13}-470.22164{col 29}15.366241
d_dist19{col 13}-145.96789{col 29}-13.942165
d_dist20{col 13}6.7867308{col 29}10.87327
d_dist21{col 13}5.5704451{col 29}6.1695576
d_dist22{col 13}4.3372698{col 29}5.2627258
d_dist23{col 13}2.9854221{col 29}3.2745771
d_dist24{col 13}4.6304207{col 29}4.9195757
d_dist25{col 13}3.1526642{col 29}4.2873363
d_dist26{col 13}-12.437191{col 29}4.2466335
d_dist27{col 13}-42.816821{col 29}-42.72318
d_dist28{col 13}1.0579128{col 29}1.187089
d_dist29{col 13}-46.736119{col 29}-46.028881
d_dist30{col 13}-492.49342{col 29}-43.422144
d_dist31{col 13}-7.9796057{col 29}-.2253952
d_dist32{col 13}-32.04608{col 29}-27.95892
d_dist33{col 13}-33.244442{col 29}-28.184744
d_dist34{col 13}-29.196678{col 29}-24.223321
d_dist35{col 13}-4.228816{col 29}3.0088158
d_dist36{col 13}13.027719{col 29}14.687283
d_dist37{col 13}.46590805{col 29}.48409367
d_dist38{col 13}4.2301569{col 29}13.889839
d_dist39{col 13}22.127922{col 29}22.417077
d_dist40{col 13}23.902645{col 29}24.147355
d_dist41{col 13}-.46707726{col 29}-.17792225
d_dist42{col 13}7.5229225{col 29}7.8120775
d_dist43{col 13}18.552923{col 29}18.842078
d_dist44{col 13}-3.1567783{col 29}-2.6832218
d_dist45{col 13}19.480423{col 29}19.769578
d_dist46{col 13}18.428629{col 29}18.49137
d_dist47{col 13}-3.3195772{col 29}-3.0304222
d_dist48{col 13}-35.474913{col 29}-34.885087
d_dist49{col 13}-182.97142{col 29}-38.501637
d_dist50{col 13}-44.933772{col 29}-39.751228
d_dist51{col 13}-7.6747866{col 29}2.9547882
d_dist52{col 13}-28.495972{col 29}-25.179029
d_dist53{col 13}-159.64604{col 29}-25.799713
d_dist54{col 13}-30.593837{col 29}-29.156162
d_dist55{col 13}-5.5420771{col 29}-5.2529221
d_dist56{col 13}-31.353017{col 29}-30.381983
d_dist57{col 13}-34.349335{col 29}-31.665666
d_dist58{col 13}-25.989578{col 29}-25.700423
d_dist59{col 13}-4.3259735{col 29}.7909708
d_dist60{col 13}-37.9677{col 29}-33.284857
d_dist62{col 13}22.916208{col 29}27.278097
d_dist63{col 13}10.028639{col 29}12.251131
d_dist64{col 13}-.22187701{col 29}2.4164123
d_dist65{col 13}-59.121299{col 29}-7.1168801
d_dist66{col 13}-20.800827{col 29}-20.674871
d_dist67{col 13}-18.472836{col 29}-15.592862
d_dist69{col 13}3.3960884{col 29}10.982814
d_dist71{col 13}13.798855{col 29}21.354739
d_dist73{col 13}51.064716{col 29}51.695053
d_dist74{col 13}57.082906{col 29}57.786859
d_dist75{col 13}42.190406{col 29}42.89436
d_dist76{col 13}52.665405{col 29}53.369358
d_dist77{col 13}43.809139{col 29}44.700123
d_dist78{col 13}9.5121246{col 29}9.8976421
d_dist79{col 13}51.920404{col 29}52.374357
d_dist80{col 13}19.750353{col 29}21.824648
d_dist81{col 13}40.693739{col 29}40.731027
d_dist82{col 13}11.300682{col 29}11.729084
d_dist83{col 13}-1.0534033{col 29}14.964474
d_dist84{col 13}43.14192{col 29}43.887848
d_dist85{col 13}6.0800825{col 29}6.3946848
d_dist86{col 13}.18365076{col 29}10.642759
d_dist87{col 13}-10.941364{col 29}5.3231322
d_dist88{col 13}-.78864716{col 29}-.25099995
d_dist89{col 13}31.740557{col 29}33.204908
d_dist90{col 13}-9.4925163{col 29}-1.1463074
d_dist92{col 13}5.0658414{col 29}13.599531
d_dist93{col 13}-.51176739{col 29}6.4517689
d_dist94{col 13}-17.157302{col 29}-9.7976971
d_dist95{col 13}-22.883031{col 29}-20.851493
d_dist96{col 13}-24.733528{col 29}-17.40147
d_dist97{col 13}-20.977748{col 29}-13.956785
d_dist98{col 13}4.8089123{col 29}9.3015536
d_dist99{col 13}-.62665749{col 29}2.5316572
d_dist101{col 13}-47.092603{col 29}-21.776077
d_dist102{col 13}10.399913{col 29}15.272169
d_dist103{col 13}22.864211{col 29}25.201015
d_dist105{col 13}-39.335835{col 29}-38.399162
d_dist106{col 13}-7.1736584{col 29}-6.2513399
d_dist107{col 13}-11.370583{col 29}-9.3144169
d_dist108{col 13}5.6303768{col 29}7.2546291
d_dist109{col 13}-.02926826{col 29}2.904273
d_dist110{col 13}-40.688698{col 29}-39.849789
d_dist111{col 13}6.3216019{col 29}7.5783997
d_dist113{col 13}7.2758284{col 29}17.596147
d_dist114{col 13}12.748198{col 29}22.798078
d_dist115{col 13}6.8227582{col 29}14.72945
d_dist116{col 13}6.6026795{col 29}14.433363
d_dist117{col 13}3.9632237{col 29}14.69782
d_dist118{col 13}-7.6344788{col 29}-1.9592443
d_dist119{col 13}4.3673961{col 29}12.128882
d_dist120{col 13}23.673919{col 29}33.113056
d_dist121{col 13}12.318958{col 29}19.797785
d_dist123{col 13}-15.021727{col 29}-13.576416
d_dist124{col 13}-44.015889{col 29}-43.574115
d_dist125{col 13}-40.744606{col 29}-40.530397
d_dist126{col 13}-41.709719{col 29}-40.957143
d_dist127{col 13}-9.7000008{col 29}-8.3049984
d_dist128{col 13}-40.093942{col 29}-39.356061
d_dist129{col 13}-30.174129{col 29}-29.970876
d_dist130{col 13}-37.036427{col 29}-36.693575
d_dist131{col 13}-28.189721{col 29}-27.500281
d_dist132{col 13}-49.633931{col 29}-47.107693
d_dist133{col 13}-33.562222{col 29}-32.872782
d_dist134{col 13}-6.1472225{col 29}-5.4577818
d_dist135{col 13}8.8055038{col 29}9.3244915
d_dist136{col 13}10.992781{col 29}11.68222
d_dist138{col 13}-83.982831{col 29}-10.212183
d_dist139{col 13}-24.186459{col 29}-18.666337
d_dist140{col 13}-24.875009{col 29}-21.864181
d_dist141{col 13}3.8526843{col 29}4.5776557
d_dist142{col 13}11.172022{col 29}13.05332
d_dist143{col 13}-19.139324{col 29}-13.388938
d_dist144{col 13}-26.478104{col 29}2.456054
d_dist146{col 13}50.822497{col 29}52.757506
d_dist147{col 13}4.164402{col 29}4.4305983
d_dist148{col 13}29.096969{col 29}31.48303
d_dist149{col 13}32.134485{col 29}32.865517
d_dist150{col 13}29.115488{col 29}32.049512
d_dist151{col 13}-1.9151091{col 29}4.1120986
d_dist152{col 13}.13420677{col 29}.61579275
d_dist153{col 13}-3.22998{col 29}-1.1800194
d_dist155{col 13}17.442607{col 29}20.292392
d_dist156{col 13}-11.174194{col 29}-8.5558052
d_dist158{col 13}-3.6341652{col 29}-3.3066501
d_dist160{col 13}.38647652{col 29}.63352299
d_dist161{col 13}-42.793276{col 29}-42.258232
d_dist162{col 13}-33.632096{col 29}-33.387898
d_dist163{col 13}-46.190261{col 29}-45.599738
d_dist164{col 13}-38.586645{col 29}-35.703352
d_dist165{col 13}-12.897758{col 29}-12.082237
d_dist166{col 13}-34.876132{col 29}-31.878865
d_dist167{col 13}-10.180494{col 29}-6.8645048
d_dist168{col 13}-11.860338{col 29}-8.6546564
d_dist169{col 13}18.546705{col 29}19.243299
d_dist170{col 13}-45.086234{col 29}-42.008764
d_dist171{col 13}-17.562863{col 29}-16.447133
d_dist173{col 13}6.6959192{col 29}14.267453
d_dist174{col 13}16.514412{col 29}21.34396
d_dist175{col 13}-12.294405{col 29}-7.6572254
d_dist176{col 13}13.148065{col 29}17.085304
d_dist177{col 13}29.302811{col 29}32.060562
d_dist178{col 13}49.126912{col 29}52.256459
d_dist179{col 13}35.786585{col 29}37.241786
d_dist180{col 13}33.719411{col 29}35.098957
d_dist181{col 13}35.205547{col 29}38.357821
d_dist182{col 13}46.555125{col 29}47.613245
d_dist183{col 13}46.15941{col 29}49.488961
d_dist184{col 13}44.826177{col 29}45.632191
d_dist185{col 13}2.8470718{col 29}3.2212985
d_dist186{col 13}33.406458{col 29}35.776912
d_dist187{col 13}44.401457{col 29}46.771911
d_dist188{col 13}48.266457{col 29}50.636911
d_dist189{col 13}30.516457{col 29}32.036912
d_dist190{col 13}21.183712{col 29}21.854657
d_dist191{col 13}1.334451{col 29}1.383917
d_dist192{col 13}-1.585502{col 29}-1.107783
d_dist193{col 13}20.851685{col 29}22.731684
d_dist194{col 13}24.71778{col 29}25.895593
d_dist195{col 13}-36.205044{col 29}-8.0784075
d_dist196{col 13}1.2863139{col 29}1.3639158
d_dist197{col 13}-8.7327316{col 29}-6.0129689
d_dist198{col 13}-4.4358538{col 29}-4.4312962
d_dist199{col 13}18.406602{col 29}22.876765
d_dist200{col 13}22.903856{col 29}29.894512
d_dist202{col 13}11.966616{col 29}12.853384
d_dist203{col 13}.57801437{col 29}.74698353
d_dist204{col 13}-32.600196{col 29}-28.794806
d_dist205{col 13}1.3871899{col 29}1.437808
d_dist206{col 13}-21.466846{col 29}-20.647922
d_dist207{col 13}-32.5415{col 29}-32.518501
d_dist208{col 13}5.7195339{col 29}6.570466
d_dist209{col 13}-9.9502134{col 29}-9.7497864
d_dist210{col 13}-28.31031{col 29}-28.259691
d_dist211{col 13}-24.987402{col 29}-24.317599
d_dist212{col 13}-8.0293818{col 29}-5.6406202
d_dist213{col 13}6.6544781{col 29}6.6655207
d_dist215{col 13}-3.0562458{col 29}-2.5087528
d_dist216{col 13}-9.8478136{col 29}-9.2421851
d_dist217{col 13}-14.102444{col 29}-11.367558
d_dist218{col 13}-17.249573{col 29}-11.239264
d_dist219{col 13}-17.589501{col 29}-12.106776
d_dist220{col 13}18.65324{col 29}19.466763
d_dist221{col 13}-13.828979{col 29}-10.33602
d_dist222{col 13}-19.480244{col 29}-14.424757
d_dist223{col 13}15.646197{col 29}22.729032
d_dist224{col 13}9.403759{col 29}13.541245
d_dist225{col 13}35.912977{col 29}40.497721
d_dist226{col 13}-9.7696943{col 29}-6.2553053
d_dist227{col 13}11.051532{col 29}14.128702
d_dist228{col 13}-14.193558{col 29}-10.06621
d_dist229{col 13}-6.216598{col 29}-1.4134045
d_dist230{col 13}-7.719203{col 29}-4.2857962
d_dist231{col 13}24.693407{col 29}25.851595
d_dist233{col 13}-9.726984{col 29}-8.7230167
d_dist234{col 13}29.762502{col 29}32.142497
d_dist235{col 13}-52.931448{col 29}-18.117448
d_dist236{col 13}-23.77265{col 29}-20.145598
d_dist238{col 13}14.160229{col 29}15.994773
d_dist239{col 13}-106.99743{col 29}-24.151995
d_dist240{col 13}20.303658{col 29}20.411344
d_dist241{col 13}13.7377{col 29}15.397301
d_dist243{col 13}69.847792{col 29}72.717211
d_dist244{col 13}64.085623{col 29}68.22938
d_dist245{col 13}21.382264{col 29}22.212737
d_dist246{col 13}23.968558{col 29}27.366445
d_dist247{col 13}3.1819546{col 29}5.5593262
d_dist248{col 13}23.420668{col 29}25.044336
d_dist249{col 13}26.099312{col 29}28.365689
d_dist250{col 13}25.293959{col 29}27.796041
d_dist251{col 13}.14276629{col 29}11.198062
d_dist252{col 13}8.9046911{col 29}16.794621
d_dist253{col 13}42.219958{col 29}45.364581
d_dist254{col 13}40.211097{col 29}45.258442
d_dist255{col 13}36.712258{col 29}39.407741
d_dist256{col 13}68.302011{col 29}71.067991
d_dist257{col 13}18.016149{col 29}20.168853
d_dist258{col 13}14.628825{col 29}15.281177
d_dist259{col 13}35.449643{col 29}38.662104
d_dist260{col 13}12.508951{col 29}15.39105
d_dist262{col 13}-57.170849{col 29}-57.044152
d_dist263{col 13}-63.786768{col 29}-63.643233
d_dist264{col 13}-52.995108{col 29}-50.973145
d_dist265{col 13}-27.642212{col 29}-27.522791
d_dist266{col 13}-17.126548{col 29}-16.88845
d_dist267{col 13}-17.433357{col 29}-17.311643
d_dist268{col 13}-61.18655{col 29}-60.948452
d_dist269{col 13}-11.615351{col 29}-11.614649
d_dist271{col 13}1.3710213{col 29}1.5039816
d_dist272{col 13}-3.6857662{col 29}-.12423229
d_dist273{col 13}-5.4495897{col 29}-1.9549437
d_dist274{col 13}-65.696904{col 29}-27.184315
d_dist275{col 13}-62.338257{col 29}-23.867151
d_dist276{col 13}1.9762507{col 29}4.8192138
d_dist277{col 13}23.178318{col 29}25.321685
d_dist278{col 13}-17.387638{col 29}-12.377358
d_dist280{col 13}-13.430745{col 29}-5.0268161
d_dist281{col 13}17.190237{col 29}24.887437
d_dist282{col 13}13.800248{col 29}16.625797
d_dist283{col 13}31.518479{col 29}38.233958
d_dist284{col 13}-23.051411{col 29}-14.941152
d_dist285{col 13}-28.165926{col 29}-22.05499
d_dist286{col 13}22.702135{col 29}26.125305
cum_count_turbine{col 13}-.00492873{col 29}.10399836
_cons{col 13}32.353681{col 29}43.946731
{res}{hline 78}
{err}Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
{res}{txt}
{com}. 
. ** Rep
. plausexog uci repvotesmajorpercent d_sy* d_dist* (cum_capacity_turbine = inter), ///
>                                 vce(cluster district_fixed) gmin(-1) gmax(1) graph(cum_capacity_turbine) level(0.95) ///
>                                 yline(0) title("Republican Vote") xtitle("Delta") ytitle("Cumulative Capacity (MW)", size(small)) name(rep_capacity, replace) ///
>                                 scheme(myplain) legend(pos(6) row(1) label(1 "Upper Bound (UCI)") label(2 "Lower Bound (UCI)"))
Estimating Conely et al.'s uci method
Exogenous variables: d_sy1 d_sy2 d_sy3 d_sy4 d_sy5 d_sy6 d_sy7 d_sy8 d_sy9 d_sy10 d_sy11 d_sy12 d_sy13 d_sy14 d_sy15 d_sy16 d_sy17 d_sy18 d_sy19 d_sy20 d_sy21 d_sy22 d_sy23 d_sy24 d_sy25 d_sy26 d_sy27 d_sy28 d_sy29 d_sy30 d_sy31 d_sy32 d_sy33 d_sy34 d_sy35 d_sy36 d_sy37 d_sy38 d_sy39 d_sy40 d_sy41 d_sy42 d_sy43 d_sy44 d_sy45 d_sy46 d_sy47 d_sy48 d_sy49 d_sy50 d_sy51 d_sy52 d_sy53 d_sy54 d_sy55 d_sy56 d_sy57 d_sy58 d_sy59 d_sy60 d_sy61 d_sy62 d_sy63 d_sy64 d_sy65 d_sy66 d_sy67 d_sy68 d_sy69 d_sy70 d_sy71 d_sy72 d_sy73 d_sy74 d_sy75 d_sy76 d_sy77 d_sy78 d_sy79 d_sy80 d_sy81 d_sy82 d_sy83 d_sy84 d_sy85 d_sy86 d_sy87 d_sy88 d_sy89 d_sy90 d_sy91 d_sy92 d_sy93 d_sy94 d_sy95 d_sy96 d_sy97 d_sy98 d_sy99 d_sy100 d_dist1 d_dist2 d_dist3 d_dist4 d_dist5 d_dist6 d_dist7 d_dist8 d_dist9 d_dist10 d_dist11 d_dist12 d_dist13 d_dist14 d_dist15 d_dist16 d_dist17 d_dist18 d_dist19 d_dist20 d_dist21 d_dist22 d_dist23 d_dist24 d_dist25 d_dist26 d_dist27 d_dist28 d_dist29 d_dist30 d_dist31 d_dist32 d_dist33 d_dist34 d_dist35 d_dist36 d_dist37 d_dist38 d_dist39 d_dist40 d_dist41 d_dist42 d_dist43 d_dist44 d_dist45 d_dist46 d_dist47 d_dist48 d_dist49 d_dist50 d_dist51 d_dist52 d_dist53 d_dist54 d_dist55 d_dist56 d_dist57 d_dist58 d_dist59 d_dist60 d_dist61 d_dist62 d_dist63 d_dist64 d_dist65 d_dist66 d_dist67 d_dist68 d_dist69 d_dist70 d_dist71 d_dist72 d_dist73 d_dist74 d_dist75 d_dist76 d_dist77 d_dist78 d_dist79 d_dist80 d_dist81 d_dist82 d_dist83 d_dist84 d_dist85 d_dist86 d_dist87 d_dist88 d_dist89 d_dist90 d_dist91 d_dist92 d_dist93 d_dist94 d_dist95 d_dist96 d_dist97 d_dist98 d_dist99 d_dist100 d_dist101 d_dist102 d_dist103 d_dist104 d_dist105 d_dist106 d_dist107 d_dist108 d_dist109 d_dist110 d_dist111 d_dist112 d_dist113 d_dist114 d_dist115 d_dist116 d_dist117 d_dist118 d_dist119 d_dist120 d_dist121 d_dist122 d_dist123 d_dist124 d_dist125 d_dist126 d_dist127 d_dist128 d_dist129 d_dist130 d_dist131 d_dist132 d_dist133 d_dist134 d_dist135 d_dist136 d_dist137 d_dist138 d_dist139 d_dist140 d_dist141 d_dist142 d_dist143 d_dist144 d_dist145 d_dist146 d_dist147 d_dist148 d_dist149 d_dist150 d_dist151 d_dist152 d_dist153 d_dist154 d_dist155 d_dist156 d_dist157 d_dist158 d_dist159 d_dist160 d_dist161 d_dist162 d_dist163 d_dist164 d_dist165 d_dist166 d_dist167 d_dist168 d_dist169 d_dist170 d_dist171 d_dist172 d_dist173 d_dist174 d_dist175 d_dist176 d_dist177 d_dist178 d_dist179 d_dist180 d_dist181 d_dist182 d_dist183 d_dist184 d_dist185 d_dist186 d_dist187 d_dist188 d_dist189 d_dist190 d_dist191 d_dist192 d_dist193 d_dist194 d_dist195 d_dist196 d_dist197 d_dist198 d_dist199 d_dist200 d_dist201 d_dist202 d_dist203 d_dist204 d_dist205 d_dist206 d_dist207 d_dist208 d_dist209 d_dist210 d_dist211 d_dist212 d_dist213 d_dist214 d_dist215 d_dist216 d_dist217 d_dist218 d_dist219 d_dist220 d_dist221 d_dist222 d_dist223 d_dist224 d_dist225 d_dist226 d_dist227 d_dist228 d_dist229 d_dist230 d_dist231 d_dist232 d_dist233 d_dist234 d_dist235 d_dist236 d_dist237 d_dist238 d_dist239 d_dist240 d_dist241 d_dist242 d_dist243 d_dist244 d_dist245 d_dist246 d_dist247 d_dist248 d_dist249 d_dist250 d_dist251 d_dist252 d_dist253 d_dist254 d_dist255 d_dist256 d_dist257 d_dist258 d_dist259 d_dist260 d_dist261 d_dist262 d_dist263 d_dist264 d_dist265 d_dist266 d_dist267 d_dist268 d_dist269 d_dist270 d_dist271 d_dist272 d_dist273 d_dist274 d_dist275 d_dist276 d_dist277 d_dist278 d_dist279 d_dist280 d_dist281 d_dist282 d_dist283 d_dist284 d_dist285 d_dist286 d_dist287
Endogenous variables: cum_capacity_turbine
Instruments: inter
{err}Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular


Conley et al (2012)'s UCI results{col 55}Number of obs =      1144
{res}{hline 78}
Variable{col 13}Lower Bound{col 29}Upper Bound
{hline 78}
{txt}d_sy1{col 13}-7.9683267{col 29}4.3914408
d_sy2{col 13}-15.158526{col 29}-8.2633598
d_sy3{col 13}-19.802473{col 29}-18.371912
d_sy4{col 13}-13.015375{col 29}-10.024892
d_sy5{col 13}-35.465586{col 29}-19.611177
d_sy6{col 13}-35.178571{col 29}-24.893896
d_sy7{col 13}-36.887158{col 29}-32.319468
d_sy8{col 13}-26.608646{col 29}-25.808921
d_sy9{col 13}-19.107666{col 29}-9.8361619
d_sy10{col 13}-24.368251{col 29}-22.783684
d_sy11{col 13}-17.61937{col 29}-17.048322
d_sy12{col 13}-10.96346{col 29}-5.4376158
d_sy13{col 13}-29.822233{col 29}-14.127338
d_sy14{col 13}-27.605497{col 29}-17.812003
d_sy15{col 13}-38.34992{col 29}-35.095206
d_sy16{col 13}-34.111973{col 29}-31.474215
d_sy17{col 13}9.3108801{col 29}26.609635
d_sy18{col 13}1.0250233{col 29}13.838255
d_sy19{col 13}6.1378253{col 29}13.3902
d_sy20{col 13}13.578524{col 29}21.83607
d_sy21{col 13}1.2241936{col 29}12.616834
d_sy22{col 13}1.8691522{col 29}4.8226324
d_sy23{col 13}.03783061{col 29}2.5380116
d_sy24{col 13}8.3714574{col 29}16.019807
d_sy25{col 13}-17.592471{col 29}-.93847095
d_sy26{col 13}-20.709619{col 29}-12.725766
d_sy27{col 13}-20.045099{col 29}-19.786046
d_sy28{col 13}-4.5855708{col 29}-4.2303826
d_sy29{col 13}2.4326693{col 29}14.980241
d_sy30{col 13}-2.3970446{col 29}2.3319708
d_sy31{col 13}7.8084432{col 29}7.9742167
d_sy32{col 13}10.714946{col 29}18.214285
d_sy33{col 13}-38.248009{col 29}-25.616258
d_sy34{col 13}-44.714574{col 29}-38.477193
d_sy35{col 13}-40.609379{col 29}-40.452388
d_sy36{col 13}-37.208367{col 29}-31.227255
d_sy37{col 13}-38.054414{col 29}-32.178155
d_sy38{col 13}-42.527931{col 29}-40.911464
d_sy39{col 13}-43.80484{col 29}-34.697602
d_sy40{col 13}-22.257927{col 29}-5.7309543
d_sy41{col 13}-41.80149{col 29}-28.369854
d_sy42{col 13}-44.280177{col 29}-39.304796
d_sy43{col 13}-41.605172{col 29}-38.666743
d_sy44{col 13}-37.303934{col 29}-26.141259
d_sy45{col 13}-29.414923{col 29}-17.256603
d_sy46{col 13}-27.1701{col 29}-22.959088
d_sy47{col 13}-26.695229{col 29}-26.592642
d_sy48{col 13}-18.577283{col 29}-12.96387
d_sy49{col 13}3.0949347{col 29}16.280907
d_sy50{col 13}2.6985537{col 29}9.1083976
d_sy51{col 13}2.5978188{col 29}3.408241
d_sy52{col 13}16.067718{col 29}19.89001
d_sy53{col 13}-10.359109{col 29}1.5840858
d_sy54{col 13}-15.075359{col 29}-9.7663279
d_sy55{col 13}-14.450079{col 29}-13.124944
d_sy56{col 13}-10.950493{col 29}-2.9911954
d_sy57{col 13}-7.4952896{col 29}6.1583187
d_sy58{col 13}-18.789695{col 29}-11.287278
d_sy59{col 13}-18.629484{col 29}-16.496202
d_sy60{col 13}-10.798687{col 29}-6.7840374
d_sy61{col 13}-44.091576{col 29}-31.676659
d_sy62{col 13}-46.092994{col 29}-39.550275
d_sy63{col 13}-41.117325{col 29}-40.484405
d_sy64{col 13}-35.908536{col 29}-30.631657
d_sy65{col 13}-10.732915{col 29}4.3446834
d_sy66{col 13}-16.853546{col 29}-7.7873985
d_sy67{col 13}-11.004179{col 29}-7.9651907
d_sy68{col 13}-3.7032336{col 29}-.80243854
d_sy69{col 13}-27.21748{col 29}-12.705222
d_sy70{col 13}-30.493324{col 29}-20.512454
d_sy71{col 13}-28.28917{col 29}-22.839686
d_sy72{col 13}-16.807344{col 29}-15.888746
d_sy73{col 13}-18.950039{col 29}-1.9942748
d_sy74{col 13}-18.447781{col 29}-8.6191269
d_sy75{col 13}-14.586596{col 29}-11.885867
d_sy76{col 13}-7.0945167{col 29}-2.6752116
d_sy77{col 13}1.3299034{col 29}9.5182095
d_sy78{col 13}-9.4035139{col 29}-4.1027186
d_sy79{col 13}-1.9377163{col 29}-1.8940614
d_sy80{col 13}17.893623{col 29}18.082848
d_sy81{col 13}-18.112923{col 29}-14.100603
d_sy82{col 13}-17.89577{col 29}-17.261252
d_sy83{col 13}-28.871074{col 29}-28.240724
d_sy84{col 13}-6.2247071{col 29}.79363334
d_sy85{col 13}13.832473{col 29}24.834856
d_sy86{col 13}8.3225955{col 29}13.946974
d_sy87{col 13}12.340712{col 29}13.457294
d_sy88{col 13}19.358481{col 29}22.613177
d_sy89{col 13}-48.969298{col 29}-35.291837
d_sy90{col 13}-53.342751{col 29}-43.765048
d_sy91{col 13}-57.20954{col 29}-51.731593
d_sy92{col 13}-32.660774{col 29}-31.282584
d_sy93{col 13}-32.518992{col 29}-22.277915
d_sy94{col 13}-31.315127{col 29}-23.311719
d_sy95{col 13}-26.282596{col 29}-20.708387
d_sy96{col 13}-18.479714{col 29}-13.598973
d_sy97{col 13}-16.527132{col 29}-.11046881
d_sy98{col 13}-9.5748838{col 29}.23978382
d_sy99{col 13}-10.428648{col 29}-4.4311162
d_dist1{col 13}2.6739109{col 29}4.9043289
d_dist2{col 13}12.508481{col 29}12.761518
d_dist3{col 13}17.432069{col 29}19.382932
d_dist4{col 13}-25.631083{col 29}-22.288917
d_dist5{col 13}1.7022161{col 29}2.8827848
d_dist6{col 13}33.495557{col 29}33.779444
d_dist7{col 13}-12.64164{col 29}-10.633362
d_dist9{col 13}-2.3651958{col 29}-.78980255
d_dist10{col 13}31.219984{col 29}31.899642
d_dist11{col 13}25.262522{col 29}28.092479
d_dist12{col 13}26.025873{col 29}28.144125
d_dist13{col 13}-7.6273289{col 29}-6.1876721
d_dist14{col 13}-5.1566296{col 29}-2.0783706
d_dist15{col 13}-14.470297{col 29}-8.7097031
d_dist16{col 13}-21.195421{col 29}-15.484579
d_dist17{col 13}-20.05724{col 29}-19.882761
d_dist18{col 13}4.3487698{col 29}54.226452
d_dist19{col 13}19.641029{col 29}25.719411
d_dist20{col 13}-10.873267{col 29}-6.7867332
d_dist21{col 13}-6.1695557{col 29}-5.5704446
d_dist22{col 13}-5.2627277{col 29}-4.3372726
d_dist23{col 13}-3.2745786{col 29}-2.9854212
d_dist24{col 13}-4.9195781{col 29}-4.6304212
d_dist25{col 13}-4.287334{col 29}-3.1526661
d_dist26{col 13}-3.7419971{col 29}-3.4798637
d_dist27{col 13}42.723181{col 29}42.816819
d_dist28{col 13}-1.1870902{col 29}-1.0579111
d_dist29{col 13}46.028882{col 29}46.736116
d_dist30{col 13}63.395418{col 29}71.048742
d_dist31{col 13}.22539568{col 29}7.9796042
d_dist32{col 13}27.95892{col 29}32.046077
d_dist33{col 13}27.652729{col 29}33.269654
d_dist34{col 13}24.223322{col 29}29.196677
d_dist35{col 13}-3.0088153{col 29}4.2288146
d_dist36{col 13}-14.68728{col 29}-13.02772
d_dist37{col 13}-.48409462{col 29}-.46590519
d_dist38{col 13}-13.889839{col 29}-4.2301595
d_dist39{col 13}-22.417078{col 29}-22.127921
d_dist40{col 13}-24.147357{col 29}-23.902644
d_dist41{col 13}.1779213{col 29}.46707869
d_dist42{col 13}-7.8120785{col 29}-7.5229211
d_dist43{col 13}-18.842079{col 29}-18.552922
d_dist44{col 13}2.6832232{col 29}3.1567779
d_dist45{col 13}-19.769578{col 29}-19.480421
d_dist46{col 13}-18.491372{col 29}-18.428629
d_dist47{col 13}3.0304217{col 29}3.3195786
d_dist48{col 13}34.885089{col 29}35.474912
d_dist49{col 13}44.984645{col 29}46.17718
d_dist50{col 13}39.751228{col 29}44.933769
d_dist51{col 13}-2.9547853{col 29}7.6747851
d_dist52{col 13}25.179029{col 29}28.495971
d_dist53{col 13}31.776703{col 29}33.528953
d_dist54{col 13}29.156163{col 29}30.593835
d_dist55{col 13}5.2529206{col 29}5.542078
d_dist56{col 13}30.381984{col 29}31.353014
d_dist57{col 13}31.665667{col 29}34.349334
d_dist58{col 13}25.700422{col 29}25.989579
d_dist59{col 13}-.79097176{col 29}4.3259721
d_dist60{col 13}33.668233{col 29}37.949529
d_dist62{col 13}-27.281681{col 29}-22.840542
d_dist63{col 13}-12.255053{col 29}-9.9458612
d_dist64{col 13}-2.4200931{col 29}.299543
d_dist65{col 13}7.6767394{col 29}47.308025
d_dist66{col 13}20.671286{col 29}20.876494
d_dist67{col 13}15.668527{col 29}18.469251
d_dist69{col 13}-6.8472029{col 29}-3.5920882
d_dist71{col 13}-20.868039{col 29}-13.82192
d_dist73{col 13}-51.695619{col 29}-51.052717
d_dist74{col 13}-57.787429{col 29}-57.070907
d_dist75{col 13}-42.89493{col 29}-42.178407
d_dist76{col 13}-53.36993{col 29}-52.653407
d_dist77{col 13}-44.69912{col 29}-43.830285
d_dist78{col 13}-9.8982117{col 29}-9.5001241
d_dist79{col 13}-52.374929{col 29}-51.908407
d_dist80{col 13}-21.83087{col 29}-19.750058
d_dist81{col 13}-40.731595{col 29}-40.68174
d_dist82{col 13}-11.717083{col 29}-11.301251
d_dist83{col 13}-14.920349{col 29}.12232192
d_dist84{col 13}-43.888416{col 29}-43.129919
d_dist85{col 13}-6.3952534{col 29}-6.0680829
d_dist86{col 13}-10.481363{col 29}-3.589207
d_dist87{col 13}-5.350149{col 29}11.511495
d_dist88{col 13}.25889987{col 29}.62201838
d_dist89{col 13}-33.26064{col 29}-31.737915
d_dist90{col 13}1.1718995{col 29}8.9524841
d_dist92{col 13}-13.596581{col 29}-5.1280744
d_dist93{col 13}-6.4517679{col 29}.51176834
d_dist94{col 13}9.797698{col 29}17.157301
d_dist95{col 13}20.855608{col 29}22.796198
d_dist96{col 13}17.401473{col 29}24.733528
d_dist97{col 13}13.935896{col 29}20.978737
d_dist98{col 13}-9.3519963{col 29}-4.8065217
d_dist99{col 13}-2.5316572{col 29}.62665653
d_dist101{col 13}22.109985{col 29}40.047035
d_dist102{col 13}-14.586993{col 29}-10.432385
d_dist103{col 13}-24.401173{col 29}-22.902116
d_dist105{col 13}38.399165{col 29}39.335835
d_dist106{col 13}6.251338{col 29}7.1736612
d_dist107{col 13}9.3144164{col 29}11.370582
d_dist108{col 13}-7.2546287{col 29}-5.6303706
d_dist109{col 13}-2.9042733{col 29}.02927238
d_dist110{col 13}39.832688{col 29}41.049607
d_dist111{col 13}-7.5784013{col 29}-6.3215985
d_dist113{col 13}-17.604704{col 29}-7.0952597
d_dist114{col 13}-22.807044{col 29}-12.559008
d_dist115{col 13}-14.736671{col 29}-6.6703669
d_dist116{col 13}-14.443488{col 29}-6.389045
d_dist117{col 13}-14.707943{col 29}-3.7495927
d_dist118{col 13}1.9499109{col 29}7.8314474
d_dist119{col 13}-12.137845{col 29}-4.1782075
d_dist120{col 13}-33.120021{col 29}-23.526949
d_dist121{col 13}-19.804432{col 29}-12.178657
d_dist123{col 13}13.580963{col 29}14.925731
d_dist124{col 13}43.574112{col 29}44.015888
d_dist125{col 13}40.530396{col 29}40.744602
d_dist126{col 13}40.95032{col 29}41.853627
d_dist127{col 13}8.3049996{col 29}9.6999986
d_dist128{col 13}39.356061{col 29}40.09394
d_dist129{col 13}29.970876{col 29}30.174126
d_dist130{col 13}36.693576{col 29}37.036426
d_dist131{col 13}27.500279{col 29}28.189721
d_dist132{col 13}47.127099{col 29}49.224353
d_dist133{col 13}32.872781{col 29}33.562221
d_dist134{col 13}5.4577787{col 29}6.1472208
d_dist135{col 13}-9.3244936{col 29}-8.805506
d_dist136{col 13}-11.682221{col 29}-10.992779
d_dist138{col 13}10.866545{col 29}70.175444
d_dist139{col 13}18.403549{col 29}24.19891
d_dist140{col 13}21.561389{col 29}24.889356
d_dist141{col 13}-4.8354512{col 29}-3.8404717
d_dist142{col 13}-13.041107{col 29}-11.429814
d_dist143{col 13}13.021192{col 29}19.156749
d_dist144{col 13}-1.5163424{col 29}6.649725
d_dist146{col 13}-52.757506{col 29}-50.822495
d_dist147{col 13}-4.4305992{col 29}-4.1644011
d_dist148{col 13}-31.483031{col 29}-29.096969
d_dist149{col 13}-32.865517{col 29}-32.134486
d_dist150{col 13}-32.049512{col 29}-29.115487
d_dist151{col 13}-4.1620586{col 29}2.9692964
d_dist152{col 13}-.61579418{col 29}-.13420963
d_dist153{col 13}1.1800165{col 29}3.2299795
d_dist155{col 13}-20.292393{col 29}-17.442608
d_dist156{col 13}8.5558043{col 29}11.174194
d_dist158{col 13}3.3113048{col 29}3.5359277
d_dist160{col 13}-.63352323{col 29}-.38647819
d_dist161{col 13}42.260126{col 29}42.753285
d_dist162{col 13}33.3879{col 29}33.632098
d_dist163{col 13}45.599737{col 29}46.19026
d_dist164{col 13}35.703352{col 29}38.586646
d_dist165{col 13}12.08224{col 29}12.89776
d_dist166{col 13}31.878867{col 29}34.876134
d_dist167{col 13}6.8645048{col 29}10.180496
d_dist168{col 13}8.6546602{col 29}11.860342
d_dist169{col 13}-19.243295{col 29}-18.546704
d_dist170{col 13}42.008764{col 29}45.086234
d_dist171{col 13}16.447134{col 29}17.562865
d_dist173{col 13}-14.911927{col 29}-6.6653759
d_dist174{col 13}-21.988433{col 29}-16.483868
d_dist175{col 13}7.0127489{col 29}12.324945
d_dist176{col 13}-17.729779{col 29}-13.117521
d_dist177{col 13}-32.705036{col 29}-29.272267
d_dist178{col 13}-52.900933{col 29}-49.096368
d_dist179{col 13}-37.211241{col 29}-36.43106
d_dist180{col 13}-35.743434{col 29}-33.688869
d_dist181{col 13}-39.002297{col 29}-35.175004
d_dist182{col 13}-48.257719{col 29}-46.524582
d_dist183{col 13}-50.133433{col 29}-46.128868
d_dist184{col 13}-46.276669{col 29}-44.795633
d_dist185{col 13}-3.865774{col 29}-2.8165285
d_dist186{col 13}-35.746368{col 29}-34.050933
d_dist187{col 13}-46.741368{col 29}-45.045933
d_dist188{col 13}-50.606368{col 29}-48.910933
d_dist189{col 13}-32.006368{col 29}-31.160934
d_dist190{col 13}-21.828188{col 29}-21.824114
d_dist191{col 13}-1.9789274{col 29}-1.3533747
d_dist192{col 13}.4446644{col 29}1.6169291
d_dist193{col 13}-23.37616{col 29}-20.821141
d_dist194{col 13}-25.865047{col 29}-25.362254
d_dist195{col 13}8.1803838{col 29}34.053282
d_dist196{col 13}-1.9521185{col 29}-1.3323618
d_dist197{col 13}5.2800517{col 29}8.7674663
d_dist198{col 13}2.9188342{col 29}4.5075342
d_dist199{col 13}-23.521241{col 29}-18.376059
d_dist200{col 13}-30.538989{col 29}-22.873312
d_dist202{col 13}-12.853384{col 29}-11.966616
d_dist203{col 13}-.74698257{col 29}-.57801437
d_dist204{col 13}28.794804{col 29}32.600197
d_dist205{col 13}-1.437809{col 29}-1.3871918
d_dist206{col 13}20.623477{col 29}21.468005
d_dist207{col 13}32.518501{col 29}32.541499
d_dist208{col 13}-6.570467{col 29}-5.7195334
d_dist209{col 13}9.7497854{col 29}9.9502134
d_dist210{col 13}28.259691{col 29}28.310308
d_dist211{col 13}24.317598{col 29}24.987402
d_dist212{col 13}5.6406183{col 29}8.0293818
d_dist213{col 13}-6.6655211{col 29}-6.6544781
d_dist215{col 13}2.5087509{col 29}3.0562449
d_dist216{col 13}9.2421827{col 29}9.8478127
d_dist217{col 13}11.367557{col 29}14.102443
d_dist218{col 13}11.131043{col 29}17.254699
d_dist219{col 13}12.138785{col 29}17.587982
d_dist220{col 13}-19.466763{col 29}-18.65324
d_dist221{col 13}10.33602{col 29}13.828976
d_dist222{col 13}14.424755{col 29}19.480242
d_dist223{col 13}-22.753788{col 29}-15.645027
d_dist224{col 13}-13.541243{col 29}-9.403759
d_dist225{col 13}-40.565221{col 29}-35.909779
d_dist226{col 13}6.2553043{col 29}9.7696924
d_dist227{col 13}-14.153146{col 29}-11.050375
d_dist228{col 13}10.049544{col 29}14.194347
d_dist229{col 13}1.4134035{col 29}6.2165966
d_dist230{col 13}4.2857962{col 29}7.719202
d_dist231{col 13}-25.851595{col 29}-24.693408
d_dist233{col 13}8.7230186{col 29}9.7269831
d_dist234{col 13}-32.142498{col 29}-29.7625
d_dist235{col 13}18.123744{col 29}52.79856
d_dist236{col 13}20.159028{col 29}23.48923
d_dist238{col 13}-15.994773{col 29}-14.160228
d_dist239{col 13}25.076563{col 29}87.488699
d_dist240{col 13}-20.411343{col 29}-20.303658
d_dist241{col 13}-15.397302{col 29}-13.737699
d_dist243{col 13}-72.717209{col 29}-69.847787
d_dist244{col 13}-68.229377{col 29}-64.08562
d_dist245{col 13}-22.212735{col 29}-21.382261
d_dist246{col 13}-27.366443{col 29}-23.968555
d_dist247{col 13}-5.5559127{col 29}-3.2539373
d_dist248{col 13}-25.044334{col 29}-23.420665
d_dist249{col 13}-28.365687{col 29}-26.09931
d_dist250{col 13}-27.79604{col 29}-25.293956
d_dist251{col 13}-11.19272{col 29}-.25545084
d_dist252{col 13}-16.767832{col 29}-9.4699077
d_dist253{col 13}-45.374512{col 29}-42.010374
d_dist254{col 13}-45.298421{col 29}-39.367464
d_dist255{col 13}-39.40774{col 29}-36.712258
d_dist256{col 13}-71.067988{col 29}-68.302009
d_dist257{col 13}-20.168851{col 29}-18.016146
d_dist258{col 13}-15.281174{col 29}-14.628824
d_dist259{col 13}-38.679545{col 29}-35.081598
d_dist260{col 13}-15.391049{col 29}-12.508948
d_dist262{col 13}57.04415{col 29}57.170849
d_dist263{col 13}63.643234{col 29}63.786766
d_dist264{col 13}50.976408{col 29}52.926346
d_dist265{col 13}27.522791{col 29}27.642209
d_dist266{col 13}16.888453{col 29}17.126547
d_dist267{col 13}17.311643{col 29}17.433356
d_dist268{col 13}60.948452{col 29}61.186546
d_dist269{col 13}11.614651{col 29}11.615349
d_dist271{col 13}-1.5039806{col 29}-1.3710194
d_dist272{col 13}.12423229{col 29}3.6857672
d_dist273{col 13}1.9496124{col 29}5.4498443
d_dist274{col 13}27.012875{col 29}69.314387
d_dist275{col 13}24.643719{col 29}45.952355
d_dist276{col 13}-4.8245489{col 29}-1.9759975
d_dist277{col 13}-25.321683{col 29}-23.178317
d_dist278{col 13}12.377358{col 29}17.387639
d_dist280{col 13}7.0079022{col 29}13.336854
d_dist281{col 13}-22.930792{col 29}-17.282968
d_dist282{col 13}-14.857999{col 29}-13.884029
d_dist283{col 13}-36.252871{col 29}-31.612369
d_dist284{col 13}16.922237{col 29}22.95752
d_dist285{col 13}22.004736{col 29}29.226295
d_dist286{col 13}-24.144217{col 29}-22.796024
cum_capacity_turbine{col 13}-.06222256{col 29}.00294888
_cons{col 13}53.978718{col 29}67.744638
{res}{hline 78}
{err}Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
{res}{txt}
{com}. 
. plausexog uci repvotesmajorpercent d_sy* d_dist* (cum_count_turbine = inter), ///
>                                 vce(cluster district_fixed) gmin(-1) gmax(1) graph(cum_count_turbine) level(0.95) ///
>                                 yline(0) title("Republican Vote") xtitle("Delta") ytitle("Cumulative Count", size(small)) name(rep_count, replace) ///
>                                 scheme(myplain) legend(pos(6) row(1) label(1 "Upper Bound (UCI)") label(2 "Lower Bound (UCI)"))
Estimating Conely et al.'s uci method
Exogenous variables: d_sy1 d_sy2 d_sy3 d_sy4 d_sy5 d_sy6 d_sy7 d_sy8 d_sy9 d_sy10 d_sy11 d_sy12 d_sy13 d_sy14 d_sy15 d_sy16 d_sy17 d_sy18 d_sy19 d_sy20 d_sy21 d_sy22 d_sy23 d_sy24 d_sy25 d_sy26 d_sy27 d_sy28 d_sy29 d_sy30 d_sy31 d_sy32 d_sy33 d_sy34 d_sy35 d_sy36 d_sy37 d_sy38 d_sy39 d_sy40 d_sy41 d_sy42 d_sy43 d_sy44 d_sy45 d_sy46 d_sy47 d_sy48 d_sy49 d_sy50 d_sy51 d_sy52 d_sy53 d_sy54 d_sy55 d_sy56 d_sy57 d_sy58 d_sy59 d_sy60 d_sy61 d_sy62 d_sy63 d_sy64 d_sy65 d_sy66 d_sy67 d_sy68 d_sy69 d_sy70 d_sy71 d_sy72 d_sy73 d_sy74 d_sy75 d_sy76 d_sy77 d_sy78 d_sy79 d_sy80 d_sy81 d_sy82 d_sy83 d_sy84 d_sy85 d_sy86 d_sy87 d_sy88 d_sy89 d_sy90 d_sy91 d_sy92 d_sy93 d_sy94 d_sy95 d_sy96 d_sy97 d_sy98 d_sy99 d_sy100 d_dist1 d_dist2 d_dist3 d_dist4 d_dist5 d_dist6 d_dist7 d_dist8 d_dist9 d_dist10 d_dist11 d_dist12 d_dist13 d_dist14 d_dist15 d_dist16 d_dist17 d_dist18 d_dist19 d_dist20 d_dist21 d_dist22 d_dist23 d_dist24 d_dist25 d_dist26 d_dist27 d_dist28 d_dist29 d_dist30 d_dist31 d_dist32 d_dist33 d_dist34 d_dist35 d_dist36 d_dist37 d_dist38 d_dist39 d_dist40 d_dist41 d_dist42 d_dist43 d_dist44 d_dist45 d_dist46 d_dist47 d_dist48 d_dist49 d_dist50 d_dist51 d_dist52 d_dist53 d_dist54 d_dist55 d_dist56 d_dist57 d_dist58 d_dist59 d_dist60 d_dist61 d_dist62 d_dist63 d_dist64 d_dist65 d_dist66 d_dist67 d_dist68 d_dist69 d_dist70 d_dist71 d_dist72 d_dist73 d_dist74 d_dist75 d_dist76 d_dist77 d_dist78 d_dist79 d_dist80 d_dist81 d_dist82 d_dist83 d_dist84 d_dist85 d_dist86 d_dist87 d_dist88 d_dist89 d_dist90 d_dist91 d_dist92 d_dist93 d_dist94 d_dist95 d_dist96 d_dist97 d_dist98 d_dist99 d_dist100 d_dist101 d_dist102 d_dist103 d_dist104 d_dist105 d_dist106 d_dist107 d_dist108 d_dist109 d_dist110 d_dist111 d_dist112 d_dist113 d_dist114 d_dist115 d_dist116 d_dist117 d_dist118 d_dist119 d_dist120 d_dist121 d_dist122 d_dist123 d_dist124 d_dist125 d_dist126 d_dist127 d_dist128 d_dist129 d_dist130 d_dist131 d_dist132 d_dist133 d_dist134 d_dist135 d_dist136 d_dist137 d_dist138 d_dist139 d_dist140 d_dist141 d_dist142 d_dist143 d_dist144 d_dist145 d_dist146 d_dist147 d_dist148 d_dist149 d_dist150 d_dist151 d_dist152 d_dist153 d_dist154 d_dist155 d_dist156 d_dist157 d_dist158 d_dist159 d_dist160 d_dist161 d_dist162 d_dist163 d_dist164 d_dist165 d_dist166 d_dist167 d_dist168 d_dist169 d_dist170 d_dist171 d_dist172 d_dist173 d_dist174 d_dist175 d_dist176 d_dist177 d_dist178 d_dist179 d_dist180 d_dist181 d_dist182 d_dist183 d_dist184 d_dist185 d_dist186 d_dist187 d_dist188 d_dist189 d_dist190 d_dist191 d_dist192 d_dist193 d_dist194 d_dist195 d_dist196 d_dist197 d_dist198 d_dist199 d_dist200 d_dist201 d_dist202 d_dist203 d_dist204 d_dist205 d_dist206 d_dist207 d_dist208 d_dist209 d_dist210 d_dist211 d_dist212 d_dist213 d_dist214 d_dist215 d_dist216 d_dist217 d_dist218 d_dist219 d_dist220 d_dist221 d_dist222 d_dist223 d_dist224 d_dist225 d_dist226 d_dist227 d_dist228 d_dist229 d_dist230 d_dist231 d_dist232 d_dist233 d_dist234 d_dist235 d_dist236 d_dist237 d_dist238 d_dist239 d_dist240 d_dist241 d_dist242 d_dist243 d_dist244 d_dist245 d_dist246 d_dist247 d_dist248 d_dist249 d_dist250 d_dist251 d_dist252 d_dist253 d_dist254 d_dist255 d_dist256 d_dist257 d_dist258 d_dist259 d_dist260 d_dist261 d_dist262 d_dist263 d_dist264 d_dist265 d_dist266 d_dist267 d_dist268 d_dist269 d_dist270 d_dist271 d_dist272 d_dist273 d_dist274 d_dist275 d_dist276 d_dist277 d_dist278 d_dist279 d_dist280 d_dist281 d_dist282 d_dist283 d_dist284 d_dist285 d_dist286 d_dist287
Endogenous variables: cum_count_turbine
Instruments: inter
{err}Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular


Conley et al (2012)'s UCI results{col 55}Number of obs =      1144
{res}{hline 78}
Variable{col 13}Lower Bound{col 29}Upper Bound
{hline 78}
{txt}d_sy1{col 13}-7.8724181{col 29}2.3677285
d_sy2{col 13}-15.062617{col 29}-10.287072
d_sy3{col 13}-20.395624{col 29}-19.706565
d_sy4{col 13}-15.242439{col 29}-9.9193457
d_sy5{col 13}-35.361542{col 29}-21.806561
d_sy6{col 13}-35.082841{col 29}-26.913835
d_sy7{col 13}-36.790597{col 29}-34.356953
d_sy8{col 13}-28.654039{col 29}-25.711985
d_sy9{col 13}-18.968521{col 29}-12.772173
d_sy10{col 13}-25.630063{col 29}-24.233355
d_sy11{col 13}-18.005226{col 29}-17.57402
d_sy12{col 13}-12.219705{col 29}-5.3780794
d_sy13{col 13}-29.899456{col 29}-12.497892
d_sy14{col 13}-27.711635{col 29}-15.572461
d_sy15{col 13}-38.459596{col 29}-32.781012
d_sy16{col 13}-31.595887{col 29}-31.544645
d_sy17{col 13}9.3907143{col 29}24.925099
d_sy18{col 13}1.0922221{col 29}12.420331
d_sy19{col 13}6.2176632{col 29}11.705586
d_sy20{col 13}13.652662{col 29}20.271738
d_sy21{col 13}1.3255457{col 29}10.478263
d_sy22{col 13}1.9702344{col 29}2.6897555
d_sy23{col 13}-2.0230569{col 29}2.635682
d_sy24{col 13}6.4535906{col 29}16.110699
d_sy25{col 13}-17.492993{col 29}-3.0375098
d_sy26{col 13}-20.61014{col 29}-14.824805
d_sy27{col 13}-21.770785{col 29}-19.951038
d_sy28{col 13}-6.3457662{col 29}-4.4853177
d_sy29{col 13}2.4687556{col 29}14.218805
d_sy30{col 13}-2.3820594{col 29}2.0157785
d_sy31{col 13}6.4252285{col 29}7.8818534
d_sy32{col 13}8.2427176{col 29}18.33145
d_sy33{col 13}-38.15183{col 29}-27.645694
d_sy34{col 13}-44.618394{col 29}-40.50663
d_sy35{col 13}-42.638816{col 29}-40.356208
d_sy36{col 13}-39.418257{col 29}-31.122523
d_sy37{col 13}-37.963788{col 29}-34.090418
d_sy38{col 13}-44.424923{col 29}-40.821561
d_sy39{col 13}-45.678029{col 29}-34.608827
d_sy40{col 13}-24.019137{col 29}-5.6474863
d_sy41{col 13}-41.702543{col 29}-30.457671
d_sy42{col 13}-44.181832{col 29}-41.379902
d_sy43{col 13}-43.651608{col 29}-38.569757
d_sy44{col 13}-39.392775{col 29}-26.042264
d_sy45{col 13}-29.301008{col 29}-19.660244
d_sy46{col 13}-27.056258{col 29}-25.361219
d_sy47{col 13}-28.823503{col 29}-26.589503
d_sy48{col 13}-20.87001{col 29}-12.855212
d_sy49{col 13}3.1877014{col 29}14.323489
d_sy50{col 13}2.7913205{col 29}7.1509795
d_sy51{col 13}1.2402346{col 29}2.7005659
d_sy52{col 13}13.852361{col 29}19.995001
d_sy53{col 13}-10.260791{col 29}-.49046431
d_sy54{col 13}-14.977041{col 29}-11.840878
d_sy55{col 13}-16.524629{col 29}-13.026626
d_sy56{col 13}-13.025043{col 29}-2.8928775
d_sy57{col 13}-7.3946439{col 29}4.0346504
d_sy58{col 13}-18.689049{col 29}-13.410946
d_sy59{col 13}-18.742551{col 29}-18.523025
d_sy60{col 13}-12.996147{col 29}-6.6798945
d_sy61{col 13}-43.993112{col 29}-33.754285
d_sy62{col 13}-45.994724{col 29}-41.6238
d_sy63{col 13}-42.557929{col 29}-41.019056
d_sy64{col 13}-37.98206{col 29}-30.533388
d_sy65{col 13}-10.602481{col 29}1.5924716
d_sy66{col 13}-16.723536{col 29}-10.53066
d_sy67{col 13}-10.877968{col 29}-10.628287
d_sy68{col 13}-6.420767{col 29}-.67364812
d_sy69{col 13}-27.119073{col 29}-14.781652
d_sy70{col 13}-30.394917{col 29}-22.588884
d_sy71{col 13}-28.190763{col 29}-24.916116
d_sy72{col 13}-17.957656{col 29}-16.709294
d_sy73{col 13}-18.851085{col 29}-4.0822462
d_sy74{col 13}-18.349064{col 29}-10.702098
d_sy75{col 13}-14.487879{col 29}-13.968839
d_sy76{col 13}-9.1388026{col 29}-2.578328
d_sy77{col 13}1.4237991{col 29}7.5369704
d_sy78{col 13}-9.3212397{col 29}-5.838739
d_sy79{col 13}-3.7432086{col 29}-1.8500808
d_sy80{col 13}15.351054{col 29}18.023089
d_sy81{col 13}-18.032412{col 29}-15.799418
d_sy82{col 13}-19.345035{col 29}-17.192568
d_sy83{col 13}-29.988729{col 29}-28.788232
d_sy84{col 13}-6.0634727{col 29}-2.6084815
d_sy85{col 13}13.926554{col 29}22.849713
d_sy86{col 13}8.4172882{col 29}11.948917
d_sy87{col 13}11.33253{col 29}12.441409
d_sy88{col 13}17.168246{col 29}22.716978
d_sy89{col 13}-48.87098{col 29}-37.366387
d_sy90{col 13}-53.244433{col 29}-45.839598
d_sy91{col 13}-57.111222{col 29}-53.806143
d_sy92{col 13}-33.357134{col 29}-32.562456
d_sy93{col 13}-32.440534{col 29}-23.933413
d_sy94{col 13}-31.24898{col 29}-24.707453
d_sy95{col 13}-26.184306{col 29}-22.782365
d_sy96{col 13}-18.329338{col 29}-16.771963
d_sy97{col 13}-16.519076{col 29}-.28045308
d_sy98{col 13}-9.5668279{col 29}.06979955
d_sy99{col 13}-10.427043{col 29}-4.4649923
d_dist1{col 13}2.6931855{col 29}4.4976265
d_dist2{col 13}12.508481{col 29}12.761518
d_dist3{col 13}17.432069{col 29}19.382932
d_dist4{col 13}-25.631083{col 29}-22.288917
d_dist5{col 13}1.7022161{col 29}2.8827848
d_dist6{col 13}33.495557{col 29}33.779444
d_dist7{col 13}-12.64164{col 29}-10.633362
d_dist9{col 13}-2.3651958{col 29}-.78980255
d_dist10{col 13}30.789735{col 29}31.920032
d_dist11{col 13}25.262522{col 29}28.092479
d_dist12{col 13}26.025873{col 29}28.144125
d_dist13{col 13}-7.6273289{col 29}-6.1876721
d_dist14{col 13}-5.1566296{col 29}-2.0783706
d_dist15{col 13}-14.470297{col 29}-8.7097031
d_dist16{col 13}-21.195421{col 29}-15.484579
d_dist17{col 13}-20.05724{col 29}-19.882761
d_dist18{col 13}-15.366239{col 29}470.22164
d_dist19{col 13}13.942165{col 29}145.96789
d_dist20{col 13}-10.873267{col 29}-6.7867332
d_dist21{col 13}-6.1695557{col 29}-5.5704446
d_dist22{col 13}-5.2627277{col 29}-4.3372726
d_dist23{col 13}-3.2745786{col 29}-2.9854212
d_dist24{col 13}-4.9195781{col 29}-4.6304212
d_dist25{col 13}-4.287334{col 29}-3.1526661
d_dist26{col 13}-4.2466342{col 29}12.437191
d_dist27{col 13}42.723181{col 29}42.816819
d_dist28{col 13}-1.1870902{col 29}-1.0579111
d_dist29{col 13}46.028882{col 29}46.736116
d_dist30{col 13}43.422145{col 29}492.49342
d_dist31{col 13}.22539568{col 29}7.9796042
d_dist32{col 13}27.95892{col 29}32.046077
d_dist33{col 13}28.184744{col 29}33.244441
d_dist34{col 13}24.223322{col 29}29.196677
d_dist35{col 13}-3.0088153{col 29}4.2288146
d_dist36{col 13}-14.68728{col 29}-13.02772
d_dist37{col 13}-.48409462{col 29}-.46590519
d_dist38{col 13}-13.889839{col 29}-4.2301595
d_dist39{col 13}-22.417078{col 29}-22.127921
d_dist40{col 13}-24.147357{col 29}-23.902644
d_dist41{col 13}.1779213{col 29}.46707869
d_dist42{col 13}-7.8120785{col 29}-7.5229211
d_dist43{col 13}-18.842079{col 29}-18.552922
d_dist44{col 13}2.6832232{col 29}3.1567779
d_dist45{col 13}-19.769578{col 29}-19.480421
d_dist46{col 13}-18.491372{col 29}-18.428629
d_dist47{col 13}3.0304217{col 29}3.3195786
d_dist48{col 13}34.885089{col 29}35.474912
d_dist49{col 13}38.501638{col 29}182.97142
d_dist50{col 13}39.751228{col 29}44.933769
d_dist51{col 13}-2.9547853{col 29}7.6747851
d_dist52{col 13}25.179029{col 29}28.495971
d_dist53{col 13}25.799712{col 29}159.64603
d_dist54{col 13}29.156163{col 29}30.593835
d_dist55{col 13}5.2529206{col 29}5.542078
d_dist56{col 13}30.381984{col 29}31.353014
d_dist57{col 13}31.665667{col 29}34.349334
d_dist58{col 13}25.700422{col 29}25.989579
d_dist59{col 13}-.79097176{col 29}4.3259721
d_dist60{col 13}33.284857{col 29}37.967698
d_dist62{col 13}-27.278095{col 29}-22.916208
d_dist63{col 13}-12.25113{col 29}-10.028639
d_dist64{col 13}-2.4164123{col 29}.22187701
d_dist65{col 13}7.1168801{col 29}59.121298
d_dist66{col 13}20.674872{col 29}20.800828
d_dist67{col 13}15.592862{col 29}18.472837
d_dist69{col 13}-10.982814{col 29}-3.3960916
d_dist71{col 13}-21.354738{col 29}-13.798854
d_dist73{col 13}-51.69505{col 29}-51.064716
d_dist74{col 13}-57.78686{col 29}-57.082906
d_dist75{col 13}-42.894361{col 29}-42.190406
d_dist76{col 13}-53.369361{col 29}-52.665406
d_dist77{col 13}-44.700123{col 29}-43.809138
d_dist78{col 13}-9.8976431{col 29}-9.5121236
d_dist79{col 13}-52.37436{col 29}-51.920406
d_dist80{col 13}-21.824648{col 29}-19.750353
d_dist81{col 13}-40.731027{col 29}-40.693739
d_dist82{col 13}-11.729083{col 29}-11.300682
d_dist83{col 13}-14.964475{col 29}1.053403
d_dist84{col 13}-43.887848{col 29}-43.141918
d_dist85{col 13}-6.3946848{col 29}-6.0800825
d_dist86{col 13}-10.642761{col 29}-.18365141
d_dist87{col 13}-5.3231292{col 29}10.941366
d_dist88{col 13}.25100282{col 29}.78864952
d_dist89{col 13}-33.204907{col 29}-31.740557
d_dist90{col 13}1.146306{col 29}9.4925167
d_dist92{col 13}-13.599531{col 29}-5.0658397
d_dist93{col 13}-6.4517679{col 29}.51176834
d_dist94{col 13}9.797698{col 29}17.157301
d_dist95{col 13}20.851493{col 29}22.883031
d_dist96{col 13}17.401473{col 29}24.733528
d_dist97{col 13}13.956784{col 29}20.977747
d_dist98{col 13}-9.3015527{col 29}-4.8089123
d_dist99{col 13}-2.5316572{col 29}.62665653
d_dist101{col 13}21.776078{col 29}47.092605
d_dist102{col 13}-15.272169{col 29}-10.399913
d_dist103{col 13}-25.201012{col 29}-22.86421
d_dist105{col 13}38.399165{col 29}39.335835
d_dist106{col 13}6.251338{col 29}7.1736612
d_dist107{col 13}9.3144164{col 29}11.370582
d_dist108{col 13}-7.2546287{col 29}-5.6303706
d_dist109{col 13}-2.9042733{col 29}.02927238
d_dist110{col 13}39.849792{col 29}40.6887
d_dist111{col 13}-7.5784013{col 29}-6.3215985
d_dist113{col 13}-17.596147{col 29}-7.2758313
d_dist114{col 13}-22.798078{col 29}-12.7482
d_dist115{col 13}-14.729449{col 29}-6.8227611
d_dist116{col 13}-14.433364{col 29}-6.6026812
d_dist117{col 13}-14.697819{col 29}-3.963229
d_dist118{col 13}1.9592458{col 29}7.6344774
d_dist119{col 13}-12.128879{col 29}-4.3673997
d_dist120{col 13}-33.113056{col 29}-23.673921
d_dist121{col 13}-19.797783{col 29}-12.318961
d_dist123{col 13}13.576414{col 29}15.021727
d_dist124{col 13}43.574112{col 29}44.015888
d_dist125{col 13}40.530396{col 29}40.744602
d_dist126{col 13}40.95714{col 29}41.709718
d_dist127{col 13}8.3049996{col 29}9.6999986
d_dist128{col 13}39.356061{col 29}40.09394
d_dist129{col 13}29.970876{col 29}30.174126
d_dist130{col 13}36.693576{col 29}37.036426
d_dist131{col 13}27.500279{col 29}28.189721
d_dist132{col 13}47.107689{col 29}49.633931
d_dist133{col 13}32.872781{col 29}33.562221
d_dist134{col 13}5.4577787{col 29}6.1472208
d_dist135{col 13}-9.3244936{col 29}-8.805506
d_dist136{col 13}-11.682221{col 29}-10.992779
d_dist138{col 13}10.21218{col 29}83.982826
d_dist139{col 13}18.666335{col 29}24.186456
d_dist140{col 13}21.864178{col 29}24.875006
d_dist141{col 13}-4.5776609{col 29}-3.852689
d_dist142{col 13}-13.053324{col 29}-11.172024
d_dist143{col 13}13.388935{col 29}19.139321
d_dist144{col 13}-2.4560566{col 29}26.4781
d_dist146{col 13}-52.757506{col 29}-50.822495
d_dist147{col 13}-4.4305992{col 29}-4.1644011
d_dist148{col 13}-31.483031{col 29}-29.096969
d_dist149{col 13}-32.865517{col 29}-32.134486
d_dist150{col 13}-32.049512{col 29}-29.115487
d_dist151{col 13}-4.1120981{col 29}1.915108
d_dist152{col 13}-.61579418{col 29}-.13420963
d_dist153{col 13}1.1800165{col 29}3.2299795
d_dist155{col 13}-20.292393{col 29}-17.442608
d_dist156{col 13}8.5558043{col 29}11.174194
d_dist158{col 13}3.3066491{col 29}3.6341642
d_dist160{col 13}-.63352323{col 29}-.38647819
d_dist161{col 13}42.258231{col 29}42.793277
d_dist162{col 13}33.3879{col 29}33.632098
d_dist163{col 13}45.599737{col 29}46.19026
d_dist164{col 13}35.703352{col 29}38.586646
d_dist165{col 13}12.08224{col 29}12.89776
d_dist166{col 13}31.878867{col 29}34.876134
d_dist167{col 13}6.8645048{col 29}10.180496
d_dist168{col 13}8.6546602{col 29}11.860342
d_dist169{col 13}-19.243295{col 29}-18.546704
d_dist170{col 13}42.008764{col 29}45.086234
d_dist171{col 13}16.447134{col 29}17.562865
d_dist173{col 13}-14.267452{col 29}-6.6959192
d_dist174{col 13}-21.343957{col 29}-16.514411
d_dist175{col 13}7.6572244{col 29}12.294402
d_dist176{col 13}-17.085303{col 29}-13.148064
d_dist177{col 13}-32.06056{col 29}-29.30281
d_dist178{col 13}-52.256458{col 29}-49.126911
d_dist179{col 13}-37.241784{col 29}-35.786585
d_dist180{col 13}-35.098958{col 29}-33.719412
d_dist181{col 13}-38.357821{col 29}-35.205548
d_dist182{col 13}-47.613243{col 29}-46.555125
d_dist183{col 13}-49.488958{col 29}-46.159411
d_dist184{col 13}-45.632193{col 29}-44.826176
d_dist185{col 13}-3.2212984{col 29}-2.8470718
d_dist186{col 13}-35.776911{col 29}-33.406458
d_dist187{col 13}-46.771912{col 29}-44.401458
d_dist188{col 13}-50.636911{col 29}-48.266458
d_dist189{col 13}-32.036912{col 29}-30.516458
d_dist190{col 13}-21.854657{col 29}-21.183712
d_dist191{col 13}-1.3839179{col 29}-1.3344519
d_dist192{col 13}1.1077831{col 29}1.5855023
d_dist193{col 13}-22.731685{col 29}-20.851684
d_dist194{col 13}-25.89559{col 29}-24.717778
d_dist195{col 13}8.0784067{col 29}36.205042
d_dist196{col 13}-1.3639159{col 29}-1.2863139
d_dist197{col 13}6.0129699{col 29}8.7327315
d_dist198{col 13}4.431296{col 29}4.435855
d_dist199{col 13}-22.876765{col 29}-18.406602
d_dist200{col 13}-29.894513{col 29}-22.903855
d_dist202{col 13}-12.853384{col 29}-11.966616
d_dist203{col 13}-.74698257{col 29}-.57801437
d_dist204{col 13}28.794804{col 29}32.600197
d_dist205{col 13}-1.437809{col 29}-1.3871918
d_dist206{col 13}20.647921{col 29}21.466846
d_dist207{col 13}32.518501{col 29}32.541499
d_dist208{col 13}-6.570467{col 29}-5.7195334
d_dist209{col 13}9.7497854{col 29}9.9502134
d_dist210{col 13}28.259691{col 29}28.310308
d_dist211{col 13}24.317598{col 29}24.987402
d_dist212{col 13}5.6406183{col 29}8.0293818
d_dist213{col 13}-6.6655211{col 29}-6.6544781
d_dist215{col 13}2.5087509{col 29}3.0562449
d_dist216{col 13}9.2421827{col 29}9.8478127
d_dist217{col 13}11.367557{col 29}14.102443
d_dist218{col 13}11.239263{col 29}17.249571
d_dist219{col 13}12.106776{col 29}17.589499
d_dist220{col 13}-19.466763{col 29}-18.65324
d_dist221{col 13}10.33602{col 29}13.828976
d_dist222{col 13}14.424755{col 29}19.480242
d_dist223{col 13}-22.729033{col 29}-15.646201
d_dist224{col 13}-13.541243{col 29}-9.403759
d_dist225{col 13}-40.497723{col 29}-35.912978
d_dist226{col 13}6.2553043{col 29}9.7696924
d_dist227{col 13}-14.128702{col 29}-11.051534
d_dist228{col 13}10.06621{col 29}14.193557
d_dist229{col 13}1.4134035{col 29}6.2165966
d_dist230{col 13}4.2857962{col 29}7.719202
d_dist231{col 13}-25.851595{col 29}-24.693408
d_dist233{col 13}8.7230186{col 29}9.7269831
d_dist234{col 13}-32.142498{col 29}-29.7625
d_dist235{col 13}18.117447{col 29}52.931447
d_dist236{col 13}20.145596{col 29}23.772653
d_dist238{col 13}-15.994773{col 29}-14.160228
d_dist239{col 13}24.151998{col 29}106.99743
d_dist240{col 13}-20.411343{col 29}-20.303658
d_dist241{col 13}-15.397302{col 29}-13.737699
d_dist243{col 13}-72.717209{col 29}-69.847787
d_dist244{col 13}-68.229377{col 29}-64.08562
d_dist245{col 13}-22.212735{col 29}-21.382261
d_dist246{col 13}-27.366443{col 29}-23.968555
d_dist247{col 13}-5.5593243{col 29}-3.1819518
d_dist248{col 13}-25.044334{col 29}-23.420665
d_dist249{col 13}-28.365687{col 29}-26.09931
d_dist250{col 13}-27.79604{col 29}-25.293956
d_dist251{col 13}-11.198061{col 29}-.14276501
d_dist252{col 13}-16.794619{col 29}-8.9046884
d_dist253{col 13}-45.364579{col 29}-42.219954
d_dist254{col 13}-45.25844{col 29}-40.211095
d_dist255{col 13}-39.40774{col 29}-36.712258
d_dist256{col 13}-71.067988{col 29}-68.302009
d_dist257{col 13}-20.168851{col 29}-18.016146
d_dist258{col 13}-15.281174{col 29}-14.628824
d_dist259{col 13}-38.662102{col 29}-35.44964
d_dist260{col 13}-15.391049{col 29}-12.508948
d_dist262{col 13}57.04415{col 29}57.170849
d_dist263{col 13}63.643234{col 29}63.786766
d_dist264{col 13}50.973149{col 29}52.995107
d_dist265{col 13}27.522791{col 29}27.642209
d_dist266{col 13}16.888453{col 29}17.126547
d_dist267{col 13}17.311643{col 29}17.433356
d_dist268{col 13}60.948452{col 29}61.186546
d_dist269{col 13}11.614651{col 29}11.615349
d_dist271{col 13}-1.5039806{col 29}-1.3710194
d_dist272{col 13}.12423229{col 29}3.6857672
d_dist273{col 13}1.9549447{col 29}5.4495916
d_dist274{col 13}27.184316{col 29}65.696903
d_dist275{col 13}23.867152{col 29}62.338256
d_dist276{col 13}-4.8192166{col 29}-1.9762502
d_dist277{col 13}-25.321683{col 29}-23.178317
d_dist278{col 13}12.377358{col 29}17.387639
d_dist280{col 13}5.0268132{col 29}13.430742
d_dist281{col 13}-24.887437{col 29}-17.190238
d_dist282{col 13}-16.625797{col 29}-13.800249
d_dist283{col 13}-38.23396{col 29}-31.51848
d_dist284{col 13}14.941148{col 29}23.051409
d_dist285{col 13}22.054989{col 29}28.165924
d_dist286{col 13}-26.125305{col 29}-22.702136
cum_count_turbine{col 13}-.10399836{col 29}.00492873
_cons{col 13}56.053268{col 29}67.64632
{res}{hline 78}
{err}Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
{res}{txt}
{com}. 
. 
. ** Inc
. plausexog uci incumbvotesmajorpercent d_sy* d_dist* (cum_capacity_turbine = inter), ///
>                                 vce(cluster district_fixed) gmin(-1) gmax(1) graph(cum_capacity_turbine) level(0.95) ///
>                             yline(0) title("Incumbent Vote") xtitle("Delta") ytitle("Cumulative Capacity (MW)", size(small)) name(inc_capacity, replace) ///
>                                 scheme(myplain) legend(pos(6) row(1) label(1 "Upper Bound (UCI)") label(2 "Lower Bound (UCI)"))
Estimating Conely et al.'s uci method
Exogenous variables: d_sy1 d_sy2 d_sy3 d_sy4 d_sy5 d_sy6 d_sy7 d_sy8 d_sy9 d_sy10 d_sy11 d_sy12 d_sy13 d_sy14 d_sy15 d_sy16 d_sy17 d_sy18 d_sy19 d_sy20 d_sy21 d_sy22 d_sy23 d_sy24 d_sy25 d_sy26 d_sy27 d_sy28 d_sy29 d_sy30 d_sy31 d_sy32 d_sy33 d_sy34 d_sy35 d_sy36 d_sy37 d_sy38 d_sy39 d_sy40 d_sy41 d_sy42 d_sy43 d_sy44 d_sy45 d_sy46 d_sy47 d_sy48 d_sy49 d_sy50 d_sy51 d_sy52 d_sy53 d_sy54 d_sy55 d_sy56 d_sy57 d_sy58 d_sy59 d_sy60 d_sy61 d_sy62 d_sy63 d_sy64 d_sy65 d_sy66 d_sy67 d_sy68 d_sy69 d_sy70 d_sy71 d_sy72 d_sy73 d_sy74 d_sy75 d_sy76 d_sy77 d_sy78 d_sy79 d_sy80 d_sy81 d_sy82 d_sy83 d_sy84 d_sy85 d_sy86 d_sy87 d_sy88 d_sy89 d_sy90 d_sy91 d_sy92 d_sy93 d_sy94 d_sy95 d_sy96 d_sy97 d_sy98 d_sy99 d_sy100 d_dist1 d_dist2 d_dist3 d_dist4 d_dist5 d_dist6 d_dist7 d_dist8 d_dist9 d_dist10 d_dist11 d_dist12 d_dist13 d_dist14 d_dist15 d_dist16 d_dist17 d_dist18 d_dist19 d_dist20 d_dist21 d_dist22 d_dist23 d_dist24 d_dist25 d_dist26 d_dist27 d_dist28 d_dist29 d_dist30 d_dist31 d_dist32 d_dist33 d_dist34 d_dist35 d_dist36 d_dist37 d_dist38 d_dist39 d_dist40 d_dist41 d_dist42 d_dist43 d_dist44 d_dist45 d_dist46 d_dist47 d_dist48 d_dist49 d_dist50 d_dist51 d_dist52 d_dist53 d_dist54 d_dist55 d_dist56 d_dist57 d_dist58 d_dist59 d_dist60 d_dist61 d_dist62 d_dist63 d_dist64 d_dist65 d_dist66 d_dist67 d_dist68 d_dist69 d_dist70 d_dist71 d_dist72 d_dist73 d_dist74 d_dist75 d_dist76 d_dist77 d_dist78 d_dist79 d_dist80 d_dist81 d_dist82 d_dist83 d_dist84 d_dist85 d_dist86 d_dist87 d_dist88 d_dist89 d_dist90 d_dist91 d_dist92 d_dist93 d_dist94 d_dist95 d_dist96 d_dist97 d_dist98 d_dist99 d_dist100 d_dist101 d_dist102 d_dist103 d_dist104 d_dist105 d_dist106 d_dist107 d_dist108 d_dist109 d_dist110 d_dist111 d_dist112 d_dist113 d_dist114 d_dist115 d_dist116 d_dist117 d_dist118 d_dist119 d_dist120 d_dist121 d_dist122 d_dist123 d_dist124 d_dist125 d_dist126 d_dist127 d_dist128 d_dist129 d_dist130 d_dist131 d_dist132 d_dist133 d_dist134 d_dist135 d_dist136 d_dist137 d_dist138 d_dist139 d_dist140 d_dist141 d_dist142 d_dist143 d_dist144 d_dist145 d_dist146 d_dist147 d_dist148 d_dist149 d_dist150 d_dist151 d_dist152 d_dist153 d_dist154 d_dist155 d_dist156 d_dist157 d_dist158 d_dist159 d_dist160 d_dist161 d_dist162 d_dist163 d_dist164 d_dist165 d_dist166 d_dist167 d_dist168 d_dist169 d_dist170 d_dist171 d_dist172 d_dist173 d_dist174 d_dist175 d_dist176 d_dist177 d_dist178 d_dist179 d_dist180 d_dist181 d_dist182 d_dist183 d_dist184 d_dist185 d_dist186 d_dist187 d_dist188 d_dist189 d_dist190 d_dist191 d_dist192 d_dist193 d_dist194 d_dist195 d_dist196 d_dist197 d_dist198 d_dist199 d_dist200 d_dist201 d_dist202 d_dist203 d_dist204 d_dist205 d_dist206 d_dist207 d_dist208 d_dist209 d_dist210 d_dist211 d_dist212 d_dist213 d_dist214 d_dist215 d_dist216 d_dist217 d_dist218 d_dist219 d_dist220 d_dist221 d_dist222 d_dist223 d_dist224 d_dist225 d_dist226 d_dist227 d_dist228 d_dist229 d_dist230 d_dist231 d_dist232 d_dist233 d_dist234 d_dist235 d_dist236 d_dist237 d_dist238 d_dist239 d_dist240 d_dist241 d_dist242 d_dist243 d_dist244 d_dist245 d_dist246 d_dist247 d_dist248 d_dist249 d_dist250 d_dist251 d_dist252 d_dist253 d_dist254 d_dist255 d_dist256 d_dist257 d_dist258 d_dist259 d_dist260 d_dist261 d_dist262 d_dist263 d_dist264 d_dist265 d_dist266 d_dist267 d_dist268 d_dist269 d_dist270 d_dist271 d_dist272 d_dist273 d_dist274 d_dist275 d_dist276 d_dist277 d_dist278 d_dist279 d_dist280 d_dist281 d_dist282 d_dist283 d_dist284 d_dist285 d_dist286 d_dist287
Endogenous variables: cum_capacity_turbine
Instruments: inter
{err}Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular


Conley et al (2012)'s UCI results{col 55}Number of obs =      1046
{res}{hline 78}
Variable{col 13}Lower Bound{col 29}Upper Bound
{hline 78}
{txt}d_sy1{col 13}6.7319853{col 29}18.424989
d_sy2{col 13}1.4351899{col 29}7.5213565
d_sy3{col 13}-.30397847{col 29}.88223755
d_sy4{col 13}-3.7593041{col 29}-.09601169
d_sy5{col 13}8.7766445{col 29}24.285781
d_sy6{col 13}12.334037{col 29}22.399487
d_sy7{col 13}15.869785{col 29}20.15456
d_sy8{col 13}11.186137{col 29}12.393473
d_sy9{col 13}5.3294745{col 29}11.920325
d_sy10{col 13}13.455845{col 29}16.518533
d_sy11{col 13}5.090016{col 29}5.6021464
d_sy12{col 13}-.53015807{col 29}7.1865725
d_sy13{col 13}2.8578476{col 29}16.918741
d_sy14{col 13}8.9012708{col 29}20.441049
d_sy15{col 13}23.451274{col 29}27.551049
d_sy16{col 13}19.217973{col 29}22.124347
d_sy17{col 13}16.566582{col 29}34.178423
d_sy18{col 13}5.4965076{col 29}16.316215
d_sy19{col 13}11.18771{col 29}18.790462
d_sy20{col 13}8.7576718{col 29}17.443206
d_sy21{col 13}9.8284351{col 29}21.058652
d_sy22{col 13}13.715213{col 29}16.121976
d_sy23{col 13}14.147859{col 29}17.449205
d_sy24{col 13}6.0660515{col 29}13.458556
d_sy25{col 13}-7.8812185{col 29}8.6157814
d_sy26{col 13}-10.449477{col 29}-2.6226249
d_sy27{col 13}1.925871{col 29}2.0371712
d_sy28{col 13}-5.1518433{col 29}-4.7137557
d_sy29{col 13}10.127853{col 29}24.435853
d_sy30{col 13}7.8817859{col 29}14.41115
d_sy31{col 13}9.2074879{col 29}11.245373
d_sy32{col 13}21.275767{col 29}34.360729
d_sy33{col 13}16.532773{col 29}28.817116
d_sy34{col 13}26.422089{col 29}32.347786
d_sy35{col 13}23.812391{col 29}24.223483
d_sy36{col 13}14.350654{col 29}20.6736
d_sy37{col 13}17.700892{col 29}25.855939
d_sy38{col 13}28.05619{col 29}28.718673
d_sy39{col 13}22.511161{col 29}29.339266
d_sy40{col 13}-5.7299622{col 29}7.3656037
d_sy41{col 13}17.867969{col 29}30.944532
d_sy42{col 13}23.985012{col 29}28.615328
d_sy43{col 13}21.134518{col 29}24.350329
d_sy44{col 13}14.881021{col 29}26.321204
d_sy45{col 13}4.5513657{col 29}16.571112
d_sy46{col 13}8.3938574{col 29}11.10863
d_sy47{col 13}11.341352{col 29}11.870509
d_sy48{col 13}2.4898469{col 29}8.1181786
d_sy49{col 13}17.244298{col 29}29.695566
d_sy50{col 13}20.78586{col 29}26.824138
d_sy51{col 13}27.853958{col 29}28.282424
d_sy52{col 13}21.131925{col 29}24.918143
d_sy53{col 13}-2.8063794{col 29}8.7788532
d_sy54{col 13}-4.1727004{col 29}.95518102
d_sy55{col 13}-5.5619773{col 29}-3.8788816
d_sy56{col 13}-6.8557255{col 29}1.4615344
d_sy57{col 13}2.2693386{col 29}15.648632
d_sy58{col 13}-9.0250664{col 29}-1.7969648
d_sy59{col 13}1.3726691{col 29}3.2392838
d_sy60{col 13}-11.17144{col 29}-7.0325985
d_sy61{col 13}20.364198{col 29}32.32098
d_sy62{col 13}24.344467{col 29}30.381456
d_sy63{col 13}24.642016{col 29}24.818034
d_sy64{col 13}18.940025{col 29}24.67467
d_sy65{col 13}-8.4430988{col 29}4.0898276
d_sy66{col 13}-5.0280455{col 29}1.6979436
d_sy67{col 13}-3.8220979{col 29}-3.107853
d_sy68{col 13}-14.53569{col 29}-9.0235498
d_sy69{col 13}1.6192236{col 29}15.815754
d_sy70{col 13}5.2054204{col 29}14.873186
d_sy71{col 13}5.3172671{col 29}10.453646
d_sy72{col 13}5.7449566{col 29}6.3504543
d_sy73{col 13}.10802066{col 29}17.074608
d_sy74{col 13}-2.7873368{col 29}7.3203759
d_sy75{col 13}1.0349895{col 29}3.8350902
d_sy76{col 13}-2.7205866{col 29}1.6878101
d_sy77{col 13}14.485671{col 29}24.402088
d_sy78{col 13}-.79804306{col 29}8.1044178
d_sy79{col 13}5.2824221{col 29}8.4897642
d_sy80{col 13}14.476615{col 29}20.57616
d_sy81{col 13}1.0758716{col 29}5.2038438
d_sy82{col 13}3.1755649{col 29}3.672054
d_sy83{col 13}21.417148{col 29}22.784592
d_sy84{col 13}-5.767142{col 29}1.5997345
d_sy85{col 13}29.936582{col 29}40.512223
d_sy86{col 13}18.079696{col 29}23.348025
d_sy87{col 13}21.545371{col 29}22.387801
d_sy88{col 13}16.928702{col 29}20.381489
d_sy89{col 13}25.435166{col 29}38.77981
d_sy90{col 13}25.64685{col 29}34.873128
d_sy91{col 13}36.968567{col 29}42.121412
d_sy92{col 13}26.144819{col 29}27.210158
d_sy93{col 13}6.2676755{col 29}15.527192
d_sy94{col 13}6.7276813{col 29}14.158478
d_sy95{col 13}8.413763{col 29}13.45439
d_sy96{col 13}4.4286299{col 29}10.142088
d_sy97{col 13}1.129707{col 29}17.3087
d_sy98{col 13}.46354035{col 29}10.429078
d_sy99{col 13}6.7775317{col 29}13.12092
d_dist1{col 13}-5.5640712{col 29}-2.1839308
d_dist2{col 13}5.5366755{col 29}6.0741829
d_dist3{col 13}12.649944{col 29}14.852774
d_dist4{col 13}15.647111{col 29}19.273749
d_dist5{col 13}-5.0995893{col 29}-3.6345497
d_dist6{col 13}26.523751{col 29}27.092109
d_dist7{col 13}3.9915563{col 29}6.284305
d_dist9{col 13}.78980064{col 29}2.3651943
d_dist10{col 13}-7.1878585{col 29}-6.5243256
d_dist11{col 13}-14.150069{col 29}-11.062448
d_dist12{col 13}-12.292801{col 29}-10.155198
d_dist13{col 13}4.4952979{col 29}6.406701
d_dist14{col 13}2.0783701{col 29}5.1566315
d_dist15{col 13}9.7095068{col 29}16.704643
d_dist16{col 13}15.484578{col 29}21.195423
d_dist17{col 13}19.882758{col 29}20.057241
d_dist18{col 13}-35.509336{col 29}14.921563
d_dist19{col 13}-19.252256{col 29}-13.100364
d_dist20{col 13}6.7867308{col 29}10.87327
d_dist21{col 13}5.5704451{col 29}6.1695576
d_dist22{col 13}4.3372698{col 29}5.2627258
d_dist23{col 13}2.9854221{col 29}3.2745771
d_dist24{col 13}4.6304207{col 29}4.9195757
d_dist25{col 13}3.1526642{col 29}4.2873363
d_dist26{col 13}3.8668938{col 29}4.1179169
d_dist27{col 13}6.6385278{col 29}7.3946826
d_dist28{col 13}6.3814623{col 29}7.2393555
d_dist29{col 13}8.5588808{col 29}9.2661171
d_dist30{col 13}25.866958{col 29}34.347849
d_dist31{col 13}-7.9796057{col 29}-.2253952
d_dist32{col 13}-9.5110807{col 29}-5.4239216
d_dist33{col 13}-9.887555{col 29}-4.2718358
d_dist34{col 13}-13.246679{col 29}-8.2733221
d_dist35{col 13}-4.228816{col 29}3.0088158
d_dist36{col 13}13.027719{col 29}14.687283
d_dist37{col 13}.46590805{col 29}.48409367
d_dist38{col 13}4.2301569{col 29}13.889839
d_dist39{col 13}22.127922{col 29}22.417077
d_dist40{col 13}23.902645{col 29}24.147355
d_dist41{col 13}25.492792{col 29}25.993752
d_dist42{col 13}7.5229225{col 29}7.8120775
d_dist43{col 13}18.552923{col 29}18.842078
d_dist44{col 13}-3.1567783{col 29}-2.6832218
d_dist45{col 13}19.480423{col 29}19.769578
d_dist46{col 13}18.428629{col 29}18.49137
d_dist47{col 13}-3.3195772{col 29}-3.0304222
d_dist48{col 13}-2.5849123{col 29}-1.9950867
d_dist49{col 13}2.5579678{col 29}3.8342982
d_dist50{col 13}2.2812271{col 29}7.4637699
d_dist51{col 13}-7.6747866{col 29}2.9547882
d_dist52{col 13}-12.290972{col 29}-8.9740276
d_dist53{col 13}-10.50292{col 29}-8.66936
d_dist54{col 13}-8.313838{col 29}-6.8761635
d_dist55{col 13}-5.5420771{col 29}-5.2529221
d_dist56{col 13}-6.376196{col 29}-5.5659557
d_dist57{col 13}-5.8043346{col 29}-3.1206646
d_dist58{col 13}-11.769577{col 29}-11.480422
d_dist59{col 13}-4.3259735{col 29}.7909708
d_dist60{col 13}-2.0834446{col 29}1.96152
d_dist62{col 13}15.95249{col 29}22.4743
d_dist63{col 13}1.7812501{col 29}7.7855625
d_dist64{col 13}-5.3019985{col 29}-1.1883122
d_dist65{col 13}-39.41801{col 29}2.7533472
d_dist66{col 13}9.0826616{col 29}9.3111923
d_dist67{col 13}-.01702931{col 29}1.4168099
d_dist69{col 13}-.89498282{col 29}4.6326362
d_dist71{col 13}-20.227163{col 29}-11.927544
d_dist73{col 13}17.462864{col 29}18.105627
d_dist74{col 13}23.481054{col 29}24.197433
d_dist75{col 13}8.5885541{col 29}9.3049331
d_dist76{col 13}19.063553{col 29}19.779932
d_dist77{col 13}9.378484{col 29}10.08468
d_dist78{col 13}-7.6683604{col 29}-7.2545826
d_dist79{col 13}18.318552{col 29}18.784931
d_dist80{col 13}-14.687162{col 29}-12.606287
d_dist81{col 13}7.0918863{col 29}7.1416001
d_dist82{col 13}-12.129592{col 29}-10.877545
d_dist83{col 13}-22.586123{col 29}-8.9335764
d_dist84{col 13}9.5400674{col 29}10.298421
d_dist85{col 13}-6.3867695{col 29}-6.0597425
d_dist86{col 13}-13.037027{col 29}-6.0636267
d_dist87{col 13}-15.637363{col 29}1.3981975
d_dist88{col 13}-.6799863{col 29}-.30099496
d_dist89{col 13}.79741534{col 29}3.3428982
d_dist90{col 13}-.13331105{col 29}6.2557166
d_dist92{col 13}11.536433{col 29}20.159324
d_dist93{col 13}1.1232328{col 29}8.0867691
d_dist94{col 13}6.8284586{col 29}11.396347
d_dist95{col 13}11.11843{col 29}14.926376
d_dist96{col 13}15.156472{col 29}22.488528
d_dist97{col 13}11.672361{col 29}18.714884
d_dist98{col 13}5.9920763{col 29}10.537536
d_dist99{col 13}.44222176{col 29}2.2092523
d_dist101{col 13}14.765726{col 29}25.946475
d_dist102{col 13}-16.724502{col 29}-12.295275
d_dist103{col 13}-6.9411296{col 29}-4.248726
d_dist105{col 13}-13.559042{col 29}-12.808988
d_dist106{col 13}-7.1736584{col 29}-6.2513399
d_dist107{col 13}-9.2788269{col 29}-7.1512066
d_dist108{col 13}5.6303768{col 29}7.2546291
d_dist109{col 13}-.02926826{col 29}2.904273
d_dist110{col 13}-13.24217{col 29}-12.014097
d_dist111{col 13}6.3216019{col 29}7.5783997
d_dist113{col 13}8.1817609{col 29}15.811104
d_dist114{col 13}13.621462{col 29}20.988685
d_dist115{col 13}7.7561133{col 29}12.942294
d_dist116{col 13}7.4509605{col 29}12.624573
d_dist117{col 13}4.8115047{col 29}12.88903
d_dist118{col 13}-6.7662965{col 29}-3.7654934
d_dist119{col 13}5.2406603{col 29}10.319489
d_dist120{col 13}24.601805{col 29}31.314429
d_dist121{col 13}13.242189{col 29}17.987185
d_dist123{col 13}-9.7030479{col 29}-8.6041087
d_dist124{col 13}-10.011308{col 29}-9.5546131
d_dist125{col 13}-12.025982{col 29}-12.006608
d_dist126{col 13}-12.33333{col 29}-11.419229
d_dist127{col 13}-9.7000008{col 29}-8.3049984
d_dist128{col 13}-13.288941{col 29}-12.55106
d_dist129{col 13}-26.69061{col 29}-25.982949
d_dist130{col 13}-15.951427{col 29}-15.608574
d_dist131{col 13}-24.48972{col 29}-23.800281
d_dist132{col 13}-7.8693582{col 29}-5.7323527
d_dist133{col 13}-19.77222{col 29}-19.082781
d_dist134{col 13}-6.1472225{col 29}-5.4577818
d_dist135{col 13}9.2596196{col 29}9.7677924
d_dist136{col 13}10.992781{col 29}11.68222
d_dist138{col 13}-43.108752{col 29}16.854585
d_dist139{col 13}-5.6790302{col 29}.12221979
d_dist140{col 13}1.2173822{col 29}3.5837647
d_dist141{col 13}3.562906{col 29}4.5658533
d_dist142{col 13}12.391387{col 29}13.047799
d_dist143{col 13}-11.760179{col 29}-3.8058513
d_dist144{col 13}-1.2033099{col 29}7.1237363
d_dist146{col 13}3.4400855{col 29}5.3258158
d_dist147{col 13}-11.80301{col 29}-11.586091
d_dist148{col 13}-16.832832{col 29}-13.919342
d_dist149{col 13}-15.247927{col 29}-14.566174
d_dist150{col 13}-17.999399{col 29}-13.819441
d_dist151{col 13}-17.437648{col 29}-10.158047
d_dist152{col 13}-7.8269605{col 29}-7.4151477
d_dist153{col 13}-6.2416738{col 29}-4.1424311
d_dist155{col 13}14.672606{col 29}17.522391
d_dist156{col 13}11.45825{col 29}14.20925
d_dist158{col 13}.19913874{col 29}.34487443
d_dist160{col 13}.27029474{col 29}.67321618
d_dist161{col 13}-13.733152{col 29}-13.080533
d_dist162{col 13}-20.690894{col 29}-20.59773
d_dist163{col 13}-10.181444{col 29}-9.4350459
d_dist164{col 13}-20.077828{col 29}-17.03866
d_dist165{col 13}-12.858064{col 29}-12.198419
d_dist166{col 13}-23.518212{col 29}-20.543745
d_dist167{col 13}-10.296676{col 29}-6.8248116
d_dist168{col 13}-11.97652{col 29}-8.6149632
d_dist169{col 13}18.430523{col 29}19.282993
d_dist170{col 13}-13.772417{col 29}-10.539072
d_dist171{col 13}-17.679045{col 29}-16.40744
d_dist173{col 13}5.649019{col 29}11.754101
d_dist174{col 13}15.467512{col 29}18.830608
d_dist175{col 13}14.093694{col 29}17.264419
d_dist176{col 13}12.101165{col 29}14.571951
d_dist177{col 13}28.255911{col 29}29.54721
d_dist178{col 13}48.080012{col 29}49.743106
d_dist179{col 13}33.273233{col 29}36.194886
d_dist180{col 13}32.585605{col 29}32.672511
d_dist181{col 13}34.158647{col 29}35.844468
d_dist182{col 13}45.099893{col 29}45.508225
d_dist183{col 13}46.637305{col 29}48.763492
d_dist184{col 13}43.118838{col 29}43.779277
d_dist185{col 13}6.5486636{col 29}7.6455179
d_dist186{col 13}30.893106{col 29}34.730012
d_dist187{col 13}41.888105{col 29}45.725011
d_dist188{col 13}45.753104{col 29}49.59001
d_dist189{col 13}28.003104{col 29}30.990012
d_dist190{col 13}18.67036{col 29}20.807757
d_dist191{col 13}6.5810977{col 29}8.0970161
d_dist192{col 13}4.6140729{col 29}5.626775
d_dist193{col 13}21.696285{col 29}21.937895
d_dist194{col 13}22.204428{col 29}24.848693
d_dist195{col 13}-3.150348{col 29}25.144242
d_dist196{col 13}5.9823718{col 29}7.6630853
d_dist197{col 13}18.7376{col 29}19.806039
d_dist198{col 13}2.7664275{col 29}2.9629261
d_dist199{col 13}22.980856{col 29}27.292215
d_dist200{col 13}21.856956{col 29}27.38116
d_dist202{col 13}11.966616{col 29}12.853384
d_dist203{col 13}.57801437{col 29}.74698353
d_dist204{col 13}6.8298035{col 29}10.635196
d_dist205{col 13}1.3871899{col 29}1.437808
d_dist206{col 13}-.76670522{col 29}.11118634
d_dist207{col 13}10.5535{col 29}10.576499
d_dist208{col 13}5.7195339{col 29}6.570466
d_dist209{col 13}-9.8002138{col 29}-9.5997868
d_dist210{col 13}6.2946901{col 29}6.3453083
d_dist211{col 13}2.3866922{col 29}3.0316394
d_dist212{col 13}-7.4743814{col 29}-5.0856199
d_dist213{col 13}6.6544781{col 29}6.6655207
d_dist215{col 13}-2.9584817{col 29}-2.8247869
d_dist216{col 13}6.3402049{col 29}7.0131251
d_dist217{col 13}5.4865248{col 29}8.6352102
d_dist218{col 13}6.3036988{col 29}13.102397
d_dist219{col 13}5.9908578{col 29}11.849264
d_dist220{col 13}14.181377{col 29}15.08529
d_dist221{col 13}5.6157497{col 29}9.4899253
d_dist222{col 13}8.5437233{col 29}14.013009
d_dist223{col 13}9.1044357{col 29}16.626984
d_dist224{col 13}2.8627264{col 29}7.4140102
d_dist225{col 13}30.077977{col 29}34.985378
d_dist226{col 13}.37427257{col 29}4.3024599
d_dist227{col 13}4.5861694{col 29}8.0333115
d_dist228{col 13}4.162952{col 29}8.7214581
d_dist229{col 13}-7.6032425{col 29}-2.5644113
d_dist230{col 13}-1.8044468{col 29}2.0167947
d_dist231{col 13}18.152374{col 29}19.724361
d_dist233{col 13}6.6257671{col 29}11.544436
d_dist234{col 13}2.799003{col 29}6.0238604
d_dist235{col 13}-5.4549189{col 29}25.73454
d_dist236{col 13}17.781477{col 29}18.30389
d_dist238{col 13}10.406801{col 29}11.592759
d_dist239{col 13}-25.742815{col 29}36.634609
d_dist240{col 13}15.901644{col 29}16.657916
d_dist241{col 13}9.9842716{col 29}10.995287
d_dist243{col 13}15.947792{col 29}18.817212
d_dist244{col 13}10.185623{col 29}14.329381
d_dist245{col 13}-25.072736{col 29}-24.242262
d_dist246{col 13}-24.031442{col 29}-20.633554
d_dist247{col 13}-2.119018{col 29}.5341531
d_dist248{col 13}-25.044334{col 29}-23.420665
d_dist249{col 13}-25.927517{col 29}-23.289075
d_dist250{col 13}-21.832789{col 29}-19.077682
d_dist251{col 13}-16.938214{col 29}-5.9038106
d_dist252{col 13}-19.19048{col 29}-11.841877
d_dist253{col 13}-11.447489{col 29}-8.0702856
d_dist254{col 13}-13.095604{col 29}-7.1221756
d_dist255{col 13}-12.242764{col 29}-9.607626
d_dist256{col 13}14.402012{col 29}17.167993
d_dist257{col 13}-17.004243{col 29}-15.09281
d_dist258{col 13}-15.281174{col 29}-14.628824
d_dist259{col 13}-18.041972{col 29}-14.421077
d_dist260{col 13}-15.391049{col 29}-12.508948
d_dist262{col 13}-3.3063134{col 29}-3.1886912
d_dist263{col 13}-4.7426618{col 29}-4.5823396
d_dist264{col 13}-20.098864{col 29}-18.0987
d_dist265{col 13}-29.188106{col 29}-29.051898
d_dist266{col 13}-18.672442{col 29}-18.417557
d_dist267{col 13}-8.9174912{col 29}-8.7841766
d_dist268{col 13}-7.4374441{col 29}-7.1825594
d_dist269{col 13}-4.2938213{col 29}-4.2411798
d_dist271{col 13}1.3710213{col 29}1.5039816
d_dist272{col 13}-3.6857662{col 29}-.12423229
d_dist273{col 13}-.82400804{col 29}-.27240849
d_dist274{col 13}-26.575861{col 29}16.202212
d_dist275{col 13}-16.013547{col 29}7.7785553
d_dist276{col 13}1.9926517{col 29}4.8407216
d_dist277{col 13}23.178318{col 29}25.321685
d_dist278{col 13}-14.306479{col 29}-6.2285576
d_dist280{col 13}3.6125642{col 29}10.320038
d_dist281{col 13}2.3729453{col 29}8.3992765
d_dist282{col 13}-.36040243{col 29}.97296635
d_dist283{col 13}19.666599{col 29}25.449687
d_dist284{col 13}13.526899{col 29}19.940705
d_dist285{col 13}11.983226{col 29}18.944685
d_dist286{col 13}12.887538{col 29}14.969282
cum_capacity_turbine{col 13}-.02515375{col 29}.04065515
_cons{col 13}46.083932{col 29}59.536093
{res}{hline 78}
{err}Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
{res}{txt}
{com}. 
. plausexog uci incumbvotesmajorpercent d_sy* d_dist* (cum_count_turbine = inter), ///
>                                 vce(cluster district_fixed) gmin(-1) gmax(1) graph(cum_count_turbine) level(0.95) ///
>                                 yline(0) title("Incumbent Vote") xtitle("Delta") ytitle("Cumulative Count", size(small)) name(inc_count, replace) ///
>                                 scheme(myplain) legend(pos(6) row(1) label(1 "Upper Bound (UCI)") label(2 "Lower Bound (UCI)"))
Estimating Conely et al.'s uci method
Exogenous variables: d_sy1 d_sy2 d_sy3 d_sy4 d_sy5 d_sy6 d_sy7 d_sy8 d_sy9 d_sy10 d_sy11 d_sy12 d_sy13 d_sy14 d_sy15 d_sy16 d_sy17 d_sy18 d_sy19 d_sy20 d_sy21 d_sy22 d_sy23 d_sy24 d_sy25 d_sy26 d_sy27 d_sy28 d_sy29 d_sy30 d_sy31 d_sy32 d_sy33 d_sy34 d_sy35 d_sy36 d_sy37 d_sy38 d_sy39 d_sy40 d_sy41 d_sy42 d_sy43 d_sy44 d_sy45 d_sy46 d_sy47 d_sy48 d_sy49 d_sy50 d_sy51 d_sy52 d_sy53 d_sy54 d_sy55 d_sy56 d_sy57 d_sy58 d_sy59 d_sy60 d_sy61 d_sy62 d_sy63 d_sy64 d_sy65 d_sy66 d_sy67 d_sy68 d_sy69 d_sy70 d_sy71 d_sy72 d_sy73 d_sy74 d_sy75 d_sy76 d_sy77 d_sy78 d_sy79 d_sy80 d_sy81 d_sy82 d_sy83 d_sy84 d_sy85 d_sy86 d_sy87 d_sy88 d_sy89 d_sy90 d_sy91 d_sy92 d_sy93 d_sy94 d_sy95 d_sy96 d_sy97 d_sy98 d_sy99 d_sy100 d_dist1 d_dist2 d_dist3 d_dist4 d_dist5 d_dist6 d_dist7 d_dist8 d_dist9 d_dist10 d_dist11 d_dist12 d_dist13 d_dist14 d_dist15 d_dist16 d_dist17 d_dist18 d_dist19 d_dist20 d_dist21 d_dist22 d_dist23 d_dist24 d_dist25 d_dist26 d_dist27 d_dist28 d_dist29 d_dist30 d_dist31 d_dist32 d_dist33 d_dist34 d_dist35 d_dist36 d_dist37 d_dist38 d_dist39 d_dist40 d_dist41 d_dist42 d_dist43 d_dist44 d_dist45 d_dist46 d_dist47 d_dist48 d_dist49 d_dist50 d_dist51 d_dist52 d_dist53 d_dist54 d_dist55 d_dist56 d_dist57 d_dist58 d_dist59 d_dist60 d_dist61 d_dist62 d_dist63 d_dist64 d_dist65 d_dist66 d_dist67 d_dist68 d_dist69 d_dist70 d_dist71 d_dist72 d_dist73 d_dist74 d_dist75 d_dist76 d_dist77 d_dist78 d_dist79 d_dist80 d_dist81 d_dist82 d_dist83 d_dist84 d_dist85 d_dist86 d_dist87 d_dist88 d_dist89 d_dist90 d_dist91 d_dist92 d_dist93 d_dist94 d_dist95 d_dist96 d_dist97 d_dist98 d_dist99 d_dist100 d_dist101 d_dist102 d_dist103 d_dist104 d_dist105 d_dist106 d_dist107 d_dist108 d_dist109 d_dist110 d_dist111 d_dist112 d_dist113 d_dist114 d_dist115 d_dist116 d_dist117 d_dist118 d_dist119 d_dist120 d_dist121 d_dist122 d_dist123 d_dist124 d_dist125 d_dist126 d_dist127 d_dist128 d_dist129 d_dist130 d_dist131 d_dist132 d_dist133 d_dist134 d_dist135 d_dist136 d_dist137 d_dist138 d_dist139 d_dist140 d_dist141 d_dist142 d_dist143 d_dist144 d_dist145 d_dist146 d_dist147 d_dist148 d_dist149 d_dist150 d_dist151 d_dist152 d_dist153 d_dist154 d_dist155 d_dist156 d_dist157 d_dist158 d_dist159 d_dist160 d_dist161 d_dist162 d_dist163 d_dist164 d_dist165 d_dist166 d_dist167 d_dist168 d_dist169 d_dist170 d_dist171 d_dist172 d_dist173 d_dist174 d_dist175 d_dist176 d_dist177 d_dist178 d_dist179 d_dist180 d_dist181 d_dist182 d_dist183 d_dist184 d_dist185 d_dist186 d_dist187 d_dist188 d_dist189 d_dist190 d_dist191 d_dist192 d_dist193 d_dist194 d_dist195 d_dist196 d_dist197 d_dist198 d_dist199 d_dist200 d_dist201 d_dist202 d_dist203 d_dist204 d_dist205 d_dist206 d_dist207 d_dist208 d_dist209 d_dist210 d_dist211 d_dist212 d_dist213 d_dist214 d_dist215 d_dist216 d_dist217 d_dist218 d_dist219 d_dist220 d_dist221 d_dist222 d_dist223 d_dist224 d_dist225 d_dist226 d_dist227 d_dist228 d_dist229 d_dist230 d_dist231 d_dist232 d_dist233 d_dist234 d_dist235 d_dist236 d_dist237 d_dist238 d_dist239 d_dist240 d_dist241 d_dist242 d_dist243 d_dist244 d_dist245 d_dist246 d_dist247 d_dist248 d_dist249 d_dist250 d_dist251 d_dist252 d_dist253 d_dist254 d_dist255 d_dist256 d_dist257 d_dist258 d_dist259 d_dist260 d_dist261 d_dist262 d_dist263 d_dist264 d_dist265 d_dist266 d_dist267 d_dist268 d_dist269 d_dist270 d_dist271 d_dist272 d_dist273 d_dist274 d_dist275 d_dist276 d_dist277 d_dist278 d_dist279 d_dist280 d_dist281 d_dist282 d_dist283 d_dist284 d_dist285 d_dist286 d_dist287
Endogenous variables: cum_count_turbine
Instruments: inter
{err}Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular


Conley et al (2012)'s UCI results{col 55}Number of obs =      1046
{res}{hline 78}
Variable{col 13}Lower Bound{col 29}Upper Bound
{hline 78}
{txt}d_sy1{col 13}7.907639{col 29}17.6976
d_sy2{col 13}2.6011321{col 29}6.7999763
d_sy3{col 13}.12630817{col 29}.91780439
d_sy4{col 13}-4.5843318{col 29}1.2374524
d_sy5{col 13}10.092811{col 29}23.471455
d_sy6{col 13}13.565724{col 29}21.637431
d_sy7{col 13}17.077216{col 29}19.40751
d_sy8{col 13}10.431774{col 29}13.612723
d_sy9{col 13}7.4900387{col 29}10.583562
d_sy10{col 13}12.038595{col 29}18.809186
d_sy11{col 13}5.3462364{col 29}5.5036346
d_sy12{col 13}-1.1653559{col 29}8.213221
d_sy13{col 13}1.9960472{col 29}17.451946
d_sy14{col 13}7.1888309{col 29}21.500552
d_sy15{col 13}21.738834{col 29}28.610553
d_sy16{col 13}20.277477{col 29}20.411907
d_sy17{col 13}17.637446{col 29}33.515869
d_sy18{col 13}6.2469014{col 29}15.851939
d_sy19{col 13}12.289541{col 29}18.108748
d_sy20{col 13}9.8462791{col 29}16.769674
d_sy21{col 13}11.095669{col 29}20.274601
d_sy22{col 13}14.981551{col 29}15.33848
d_sy23{col 13}13.384289{col 29}18.683337
d_sy24{col 13}5.3382305{col 29}14.634908
d_sy25{col 13}-6.6556153{col 29}7.8574883
d_sy26{col 13}-9.2238734{col 29}-3.380918
d_sy27{col 13}1.3197406{col 29}3.0854295
d_sy28{col 13}-5.9956212{col 29}-3.3499863
d_sy29{col 13}10.850361{col 29}23.98883
d_sy30{col 13}8.3502578{col 29}14.121302
d_sy31{col 13}10.42683{col 29}10.530472
d_sy32{col 13}20.757295{col 29}35.198717
d_sy33{col 13}17.748907{col 29}28.064681
d_sy34{col 13}27.632723{col 29}31.598755
d_sy35{col 13}23.063359{col 29}25.434117
d_sy36{col 13}13.523358{col 29}22.010731
d_sy37{col 13}18.912317{col 29}25.106418
d_sy38{col 13}27.975161{col 29}29.257903
d_sy39{col 13}21.777054{col 29}30.52578
d_sy40{col 13}-6.4393282{col 29}8.5121277
d_sy41{col 13}19.11612{col 29}30.172288
d_sy42{col 13}25.224455{col 29}27.848472
d_sy43{col 13}20.376171{col 29}25.576019
d_sy44{col 13}14.100673{col 29}27.582453
d_sy45{col 13}5.9677074{col 29}15.694807
d_sy46{col 13}9.8277414{col 29}10.221472
d_sy47{col 13}11.023875{col 29}12.709739
d_sy48{col 13}1.5943681{col 29}9.5655104
d_sy49{col 13}18.39374{col 29}28.984394
d_sy50{col 13}21.970399{col 29}26.091252
d_sy51{col 13}27.452939{col 29}29.194626
d_sy52{col 13}20.267636{col 29}26.315063
d_sy53{col 13}-1.5627459{col 29}8.0094046
d_sy54{col 13}-2.9290668{col 29}.18573241
d_sy55{col 13}-6.3314259{col 29}-2.635248
d_sy56{col 13}-7.6251741{col 29}2.7051679
d_sy57{col 13}3.5414579{col 29}14.861559
d_sy58{col 13}-7.7529471{col 29}-2.5840378
d_sy59{col 13}2.3993375{col 29}2.7302457
d_sy60{col 13}-11.976137{col 29}-5.7319935
d_sy61{col 13}21.609438{col 29}31.550537
d_sy62{col 13}25.587305{col 29}29.6125
d_sy63{col 13}24.049125{col 29}25.884777
d_sy64{col 13}18.17103{col 29}25.917569
d_sy65{col 13}-7.1821004{col 29}3.3096352
d_sy66{col 13}-3.7669395{col 29}.9176846
d_sy67{col 13}-3.8664913{col 29}-2.5959367
d_sy68{col 13}-15.274683{col 29}-7.8291399
d_sy69{col 13}2.8628572{col 29}15.046305
d_sy70{col 13}6.4506694{col 29}14.102738
d_sy71{col 13}6.562516{col 29}9.6831975
d_sy72{col 13}5.5830047{col 29}6.9853593
d_sy73{col 13}1.3607403{col 29}16.299538
d_sy74{col 13}-1.5443324{col 29}6.5513165
d_sy75{col 13}2.2885526{col 29}3.0594981
d_sy76{col 13}-3.47827{col 29}2.912428
d_sy77{col 13}15.710786{col 29}23.644097
d_sy78{col 13}.34631114{col 29}7.3963943
d_sy79{col 13}6.5445739{col 29}7.7088582
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cum_count_turbine{col 13}-.04149528{col 29}.06706741
_cons{col 13}46.85338{col 29}58.292459
{res}{hline 78}
{err}Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
Warning:  variance matrix is nonsymmetric or highly singular
{res}{txt}
{com}. 
.                                 
. grc1leg dem_capacity dem_count rep_capacity rep_count inc_capacity inc_count, legendfrom(dem_count) graphregion(color(white)) ///
>                 note("Union of confidence interval approach described in Conley et al.(2012)") rows(3) cols(2) ysize(5) xsize(20)
{res}{txt}
{com}. 
.                 
. ** Export graphs
. cd "$rootDir/$graphDir" 
{res}/Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Results/Figures
{txt}
{com}. local i = 1
{txt}
{com}. foreach y in dem rep inc {c -(}
{txt}  2{com}.         foreach x in capacity count {c -(}
{txt}  3{com}.         local j: word `i' of `c(alpha)'
{txt}  4{com}.                         graph export fgA3`j'.pdf, name(`y'_`x') replace
{txt}  5{com}.                         local i = `i' + 1
{txt}  6{com}.         {c )-}
{txt}  7{com}. {c )-}
{txt}(file /Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Results/Figures/fgA3a.pdf written in PDF format)
(file /Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Results/Figures/fgA3b.pdf written in PDF format)
(file /Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Results/Figures/fgA3c.pdf written in PDF format)
(file /Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Results/Figures/fgA3d.pdf written in PDF format)
(file /Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Results/Figures/fgA3e.pdf written in PDF format)
(file /Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Results/Figures/fgA3f.pdf written in PDF format)

{com}. 
. *******************************************************************************
. /*                                                TABLE A12-13                                               */
. *******************************************************************************
. cd "$rootDir/$dataDir/Final"
{res}/Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Data/Final
{txt}
{com}. 
. ** Load election district panel
. use election_district_panel.dta, clear
{txt}
{com}. 
. ** Create instrument and fixed effects
. gen t = year - 2004
{txt}
{com}. gen inter = t * mean_wp
{txt}
{com}. 
. egen stateyear_fixed = group(state year)
{txt}
{com}. egen district_fixed = group(state district)
{txt}
{com}. egen state_fixed = group(state)
{txt}
{com}. 
. gen cum_lncapacity_turbine = log(cum_capacity_turbine + 1)
{txt}
{com}. gen cum_lncount_turbine = log(cum_count_turbine +1 )
{txt}
{com}. 
. 
. *--------------------- Cluster Standard Error by State -----------------------*
. local outcome demvotesmajorpercent repvotesmajorpercent incumbvotesmajorpercent // outcome variable 
{txt}
{com}. local endogenous cum_capacity_turbine cum_count_turbine cum_lncapacity_turbine cum_lncount_turbine // endogenous variable
{txt}
{com}. local instrument inter // instrument
{txt}
{com}. local admin1_trend stateyear_fixed // geography * time trend
{txt}
{com}. local admin2 district_fixed // panel unit (cluster variable)
{txt}
{com}. local admin3 state_fixed // robustness: state fixed effects     
{txt}
{com}.                         
. foreach y in `outcome' {c -(}
{txt}  2{com}.         // Create outcome variable label for storing estimates
.         local y_name = substr("`y'", 1, 3)
{txt}  3{com}.         
.         foreach x in `endogenous' {c -(}
{txt}  4{com}.                         // Create endogenous variable label for storing estimates
.                         tokenize "`x'", parse("_")
{txt}  5{com}.                         local x_name "`3'"
{txt}  6{com}.                         di "`x_name'"
{txt}  7{com}.                         
.                         // Run IV regression
.                         reghdfe `y' (`x' = `instrument'), absorb(`admin1_trend' `admin2') ffirst stages(first ols reduced) vce(cluster state_fixed) old
{txt}  8{com}.                         
.                         // Store IV, first stage, OLS, reduced form estimates
.                         estimates store `y_name'_`x_name'_iv
{txt}  9{com}.                         estimates restore reghdfe_first1
{txt} 10{com}.                         estimates store `y_name'_`x_name'_first
{txt} 11{com}.                         estimates restore reghdfe_ols
{txt} 12{com}.                         estimates store `y_name'_`x_name'_ols
{txt} 13{com}.                         estimates restore reghdfe_reduced
{txt} 14{com}.                         estimates store `y_name'_`x_name'_reduced
{txt} 15{com}.                 {c )-}
{txt} 16{com}. {c )-}
capacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_capacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}      6.86
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0150
{txt}{col 51}R-squared{col 67}= {res}    0.7788
{txt}{col 51}Adj R-squared{col 67}= {res}    0.6659
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1069
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}   92.3979

{txt}{ralign 78:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_capaci~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 30.68829{col 26}{space 2} 11.71733{col 37}{space 1}    2.62{col 46}{space 3}0.015{col 54}{space 4} 6.504914{col 67}{space 3} 54.87167
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              99             99 *   {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}      3.95
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0585
{txt}{col 51}R-squared{col 67}= {res}    0.8872
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8296
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0045
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}    9.1403

{txt}{ralign 86:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}demvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2} .0063053{col 34}{space 2} .0031734{col 45}{space 1}    1.99{col 54}{space 3}0.058{col 62}{space 4}-.0002443{col 75}{space 3}  .012855
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}            0              99             99 *   {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}     10.18
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0039
{txt}{col 51}R-squared{col 67}= {res}    0.8879
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8306
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0107
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}    9.1119

{txt}{ralign 78:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}demvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}  .909504{col 26}{space 2} .2850697{col 37}{space 1}    3.19{col 46}{space 3}0.004{col 54}{space 4} .3211491{col 67}{space 3} 1.497859
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              99             99 *   {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}    24{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}    24{txt})
{res}cum_capacity{col 14}{txt}|{col 18}{res}    6.86{col 28}  0.0150{col 37}{txt}|{col 42}{res}    7.15{col 51}  0.0075{col 60}{txt}|{col 65}{res}    6.86

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}7.90   {col 61}{txt}P-val={res}0.0049

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  136.63
Kleibergen-Paap Wald rk F statistic{col 65}    6.86

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}24{txt})={col 49}{res}  10.18{col 61}{txt}P-val={res}0.0039
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}  10.60{col 61}{txt}P-val={res}0.0011
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   5.76{col 61}{txt}P-val={res}0.0164

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}        25
{txt}Number of observations               N  = {res}      1143
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on state_fixed

Number of clusters (state_fixed) = {col 33}{res}    25{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,    24) = {res}    7.34
{txt}{col 55}Prob > F      = {res}  0.0123
{txt}Total (centered) SS     = {res} 63447.09059{txt}{col 55}Centered R2   = {res}  0.8801
{txt}Total (uncentered) SS   = {res} 63447.09059{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 67093.55543{txt}{col 55}Root MSE      = {res}   9.421

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}demvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2} .0296368{col 34}{space 2} .0109409{col 45}{space 1}    2.71{col 54}{space 3}0.012{col 62}{space 4} .0070559{col 75}{space 3} .0522178
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   7.901
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0049
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 136.626
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   6.859
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}            0              99             99 *   {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
count
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_count_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}      6.94
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0145
{txt}{col 51}R-squared{col 67}= {res}    0.9878
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9816
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1119
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}   53.8576

{txt}{ralign 78:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_count_~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 18.36091{col 26}{space 2} 6.971042{col 37}{space 1}    2.63{col 46}{space 3}0.015{col 54}{space 4} 3.973383{col 67}{space 3} 32.74843
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              99             99 *   {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}      4.82
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0381
{txt}{col 51}R-squared{col 67}= {res}    0.8872
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8297
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0051
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}    9.1376

{txt}{ralign 83:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}demvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} .0114508{col 31}{space 2} .0052168{col 42}{space 1}    2.20{col 51}{space 3}0.038{col 59}{space 4} .0006839{col 72}{space 3} .0222177
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}            0              99             99 *   {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}     10.18
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0039
{txt}{col 51}R-squared{col 67}= {res}    0.8879
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8306
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0107
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}    9.1119

{txt}{ralign 78:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}demvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}  .909504{col 26}{space 2} .2850697{col 37}{space 1}    3.19{col 46}{space 3}0.004{col 54}{space 4} .3211491{col 67}{space 3} 1.497859
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              99             99 *   {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}    24{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}    24{txt})
{res}cum_count_tu{col 14}{txt}|{col 18}{res}    6.94{col 28}  0.0145{col 37}{txt}|{col 42}{res}    7.23{col 51}  0.0072{col 60}{txt}|{col 65}{res}    6.94

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}7.57   {col 61}{txt}P-val={res}0.0059

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  143.95
Kleibergen-Paap Wald rk F statistic{col 65}    6.94

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}24{txt})={col 49}{res}  10.18{col 61}{txt}P-val={res}0.0039
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}  10.60{col 61}{txt}P-val={res}0.0011
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   5.76{col 61}{txt}P-val={res}0.0164

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}        25
{txt}Number of observations               N  = {res}      1143
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on state_fixed

Number of clusters (state_fixed) = {col 33}{res}    25{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,    24) = {res}    7.00
{txt}{col 55}Prob > F      = {res}  0.0142
{txt}Total (centered) SS     = {res} 63447.09059{txt}{col 55}Centered R2   = {res}  0.8808
{txt}Total (uncentered) SS   = {res} 63447.09059{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 66704.76467{txt}{col 55}Root MSE      = {res}   9.393

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}demvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} .0495348{col 31}{space 2} .0187287{col 42}{space 1}    2.64{col 51}{space 3}0.014{col 59}{space 4} .0108807{col 72}{space 3} .0881889
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   7.572
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0059
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 143.948
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   6.937
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}            0              99             99 *   {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncapacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncapacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}     10.30
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0038
{txt}{col 51}R-squared{col 67}= {res}    0.8766
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8135
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0347
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}    0.7166

{txt}{ralign 78:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncapa~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1304823{col 26}{space 2} .0406573{col 37}{space 1}    3.21{col 46}{space 3}0.004{col 54}{space 4} .0465697{col 67}{space 3} .2143949
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              99             99 *   {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}      0.11
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.7409
{txt}{col 51}R-squared{col 67}= {res}    0.8867
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8288
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0003
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}    9.1596

{txt}{ralign 88:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}  demvotesmajorpercent{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2}-.2196498{col 36}{space 2} .6566695{col 47}{space 1}   -0.33{col 56}{space 3}0.741{col 64}{space 4}-1.574949{col 77}{space 3}  1.13565
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}            0              99             99 *   {c |} 
        district_fixed {c |}            0             287            287 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}     10.18
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0039
{txt}{col 51}R-squared{col 67}= {res}    0.8879
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8306
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0107
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}    9.1119

{txt}{ralign 78:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}demvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}  .909504{col 26}{space 2} .2850697{col 37}{space 1}    3.19{col 46}{space 3}0.004{col 54}{space 4} .3211491{col 67}{space 3} 1.497859
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              99             99 *   {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}    24{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}    24{txt})
{res}cum_lncapaci{col 14}{txt}|{col 18}{res}   10.30{col 28}  0.0038{col 37}{txt}|{col 42}{res}   10.73{col 51}  0.0011{col 60}{txt}|{col 65}{res}   10.30

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}12.56  {col 61}{txt}P-val={res}0.0004

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   41.06
Kleibergen-Paap Wald rk F statistic{col 65}   10.30

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}24{txt})={col 49}{res}  10.18{col 61}{txt}P-val={res}0.0039
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}  10.60{col 61}{txt}P-val={res}0.0011
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   5.76{col 61}{txt}P-val={res}0.0164

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}        25
{txt}Number of observations               N  = {res}      1143
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on state_fixed

Number of clusters (state_fixed) = {col 33}{res}    25{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,    24) = {res}   10.79
{txt}{col 55}Prob > F      = {res}  0.0031
{txt}Total (centered) SS     = {res} 63447.09059{txt}{col 55}Centered R2   = {res}  0.8495
{txt}Total (uncentered) SS   = {res} 63447.09059{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 84220.83942{txt}{col 55}Root MSE      = {res}   10.55

{txt}{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}  demvotesmajorpercent{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2} 6.970325{col 36}{space 2} 2.122296{col 47}{space 1}    3.28{col 56}{space 3}0.003{col 64}{space 4} 2.590122{col 77}{space 3} 11.35053
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  12.557
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0004
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  41.059
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  10.300
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncapacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}            0              99             99 *   {c |} 
        district_fixed {c |}            0             287            287 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncount
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncount_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}     10.26
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0038
{txt}{col 51}R-squared{col 67}= {res}    0.9146
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8710
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0380
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}    0.6226

{txt}{ralign 78:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncoun~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1188998{col 26}{space 2} .0371139{col 37}{space 1}    3.20{col 46}{space 3}0.004{col 54}{space 4} .0423004{col 67}{space 3} .1954992
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              99             99 *   {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}      0.04
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.8353
{txt}{col 51}R-squared{col 67}= {res}    0.8867
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8288
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0001
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}    9.1605

{txt}{ralign 85:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}demvotesmajorperc~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2}-.1520435{col 33}{space 2} .7234939{col 44}{space 1}   -0.21{col 53}{space 3}0.835{col 61}{space 4}-1.645262{col 74}{space 3} 1.341175
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}            0              99             99 *   {c |} 
     district_fixed {c |}            0             287            287 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}     10.18
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0039
{txt}{col 51}R-squared{col 67}= {res}    0.8879
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8306
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0107
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}    9.1119

{txt}{ralign 78:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}demvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2}  .909504{col 26}{space 2} .2850697{col 37}{space 1}    3.19{col 46}{space 3}0.004{col 54}{space 4} .3211491{col 67}{space 3} 1.497859
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              99             99 *   {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}    24{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}    24{txt})
{res}cum_lncount_{col 14}{txt}|{col 18}{res}   10.26{col 28}  0.0038{col 37}{txt}|{col 42}{res}   10.69{col 51}  0.0011{col 60}{txt}|{col 65}{res}   10.26

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}13.08  {col 61}{txt}P-val={res}0.0003

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   45.17
Kleibergen-Paap Wald rk F statistic{col 65}   10.26

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}24{txt})={col 49}{res}  10.18{col 61}{txt}P-val={res}0.0039
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}  10.60{col 61}{txt}P-val={res}0.0011
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   5.76{col 61}{txt}P-val={res}0.0164

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}        25
{txt}Number of observations               N  = {res}      1143
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on state_fixed

Number of clusters (state_fixed) = {col 33}{res}    25{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,    24) = {res}   10.12
{txt}{col 55}Prob > F      = {res}  0.0040
{txt}Total (centered) SS     = {res} 63447.09059{txt}{col 55}Centered R2   = {res}  0.8535
{txt}Total (uncentered) SS   = {res} 63447.09059{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 81981.34746{txt}{col 55}Root MSE      = {res}   10.41

{txt}{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}demvotesmajorperc~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2} 7.649333{col 33}{space 2} 2.404446{col 44}{space 1}    3.18{col 53}{space 3}0.004{col 61}{space 4}   2.6868{col 74}{space 3} 12.61187
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  13.078
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0003
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  45.169
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  10.263
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncount_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}            0              99             99 *   {c |} 
     district_fixed {c |}            0             287            287 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
capacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_capacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}      6.86
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0150
{txt}{col 51}R-squared{col 67}= {res}    0.7788
{txt}{col 51}Adj R-squared{col 67}= {res}    0.6659
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1069
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}   92.3979

{txt}{ralign 78:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_capaci~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 30.68829{col 26}{space 2} 11.71733{col 37}{space 1}    2.62{col 46}{space 3}0.015{col 54}{space 4} 6.504914{col 67}{space 3} 54.87167
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              99             99 *   {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}      3.95
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0585
{txt}{col 51}R-squared{col 67}= {res}    0.8872
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8296
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0045
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}    9.1403

{txt}{ralign 86:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}repvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}-.0063053{col 34}{space 2} .0031734{col 45}{space 1}   -1.99{col 54}{space 3}0.058{col 62}{space 4} -.012855{col 75}{space 3} .0002443
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}            0              99             99 *   {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}     10.18
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0039
{txt}{col 51}R-squared{col 67}= {res}    0.8879
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8306
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0107
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}    9.1119

{txt}{ralign 78:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}repvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} -.909504{col 26}{space 2} .2850697{col 37}{space 1}   -3.19{col 46}{space 3}0.004{col 54}{space 4}-1.497859{col 67}{space 3} -.321149
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              99             99 *   {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}    24{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}    24{txt})
{res}cum_capacity{col 14}{txt}|{col 18}{res}    6.86{col 28}  0.0150{col 37}{txt}|{col 42}{res}    7.15{col 51}  0.0075{col 60}{txt}|{col 65}{res}    6.86

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}7.90   {col 61}{txt}P-val={res}0.0049

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  136.63
Kleibergen-Paap Wald rk F statistic{col 65}    6.86

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}24{txt})={col 49}{res}  10.18{col 61}{txt}P-val={res}0.0039
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}  10.60{col 61}{txt}P-val={res}0.0011
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   5.76{col 61}{txt}P-val={res}0.0164

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}        25
{txt}Number of observations               N  = {res}      1143
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on state_fixed

Number of clusters (state_fixed) = {col 33}{res}    25{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,    24) = {res}    7.34
{txt}{col 55}Prob > F      = {res}  0.0123
{txt}Total (centered) SS     = {res}  63447.0914{txt}{col 55}Centered R2   = {res}  0.8801
{txt}Total (uncentered) SS   = {res}  63447.0914{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 67093.55595{txt}{col 55}Root MSE      = {res}   9.421

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}repvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}-.0296368{col 34}{space 2} .0109409{col 45}{space 1}   -2.71{col 54}{space 3}0.012{col 62}{space 4}-.0522178{col 75}{space 3}-.0070559
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   7.901
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0049
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 136.626
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   6.859
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}            0              99             99 *   {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
count
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_count_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}      6.94
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0145
{txt}{col 51}R-squared{col 67}= {res}    0.9878
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9816
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1119
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}   53.8576

{txt}{ralign 78:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_count_~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 18.36091{col 26}{space 2} 6.971042{col 37}{space 1}    2.63{col 46}{space 3}0.015{col 54}{space 4} 3.973383{col 67}{space 3} 32.74843
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              99             99 *   {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}      4.82
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0381
{txt}{col 51}R-squared{col 67}= {res}    0.8872
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8297
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0051
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}    9.1376

{txt}{ralign 83:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}repvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2}-.0114508{col 31}{space 2} .0052168{col 42}{space 1}   -2.20{col 51}{space 3}0.038{col 59}{space 4}-.0222177{col 72}{space 3}-.0006839
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}            0              99             99 *   {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}     10.18
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0039
{txt}{col 51}R-squared{col 67}= {res}    0.8879
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8306
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0107
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}    9.1119

{txt}{ralign 78:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}repvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} -.909504{col 26}{space 2} .2850697{col 37}{space 1}   -3.19{col 46}{space 3}0.004{col 54}{space 4}-1.497859{col 67}{space 3} -.321149
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              99             99 *   {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}    24{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}    24{txt})
{res}cum_count_tu{col 14}{txt}|{col 18}{res}    6.94{col 28}  0.0145{col 37}{txt}|{col 42}{res}    7.23{col 51}  0.0072{col 60}{txt}|{col 65}{res}    6.94

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}7.57   {col 61}{txt}P-val={res}0.0059

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  143.95
Kleibergen-Paap Wald rk F statistic{col 65}    6.94

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}24{txt})={col 49}{res}  10.18{col 61}{txt}P-val={res}0.0039
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}  10.60{col 61}{txt}P-val={res}0.0011
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   5.76{col 61}{txt}P-val={res}0.0164

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}        25
{txt}Number of observations               N  = {res}      1143
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on state_fixed

Number of clusters (state_fixed) = {col 33}{res}    25{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,    24) = {res}    7.00
{txt}{col 55}Prob > F      = {res}  0.0142
{txt}Total (centered) SS     = {res}  63447.0914{txt}{col 55}Centered R2   = {res}  0.8808
{txt}Total (uncentered) SS   = {res}  63447.0914{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 66704.76519{txt}{col 55}Root MSE      = {res}   9.393

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}repvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2}-.0495348{col 31}{space 2} .0187287{col 42}{space 1}   -2.64{col 51}{space 3}0.014{col 59}{space 4}-.0881889{col 72}{space 3}-.0108807
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   7.572
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0059
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 143.948
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   6.937
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}            0              99             99 *   {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncapacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncapacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}     10.30
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0038
{txt}{col 51}R-squared{col 67}= {res}    0.8766
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8135
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0347
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}    0.7166

{txt}{ralign 78:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncapa~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1304823{col 26}{space 2} .0406573{col 37}{space 1}    3.21{col 46}{space 3}0.004{col 54}{space 4} .0465697{col 67}{space 3} .2143949
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              99             99 *   {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}      0.11
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.7409
{txt}{col 51}R-squared{col 67}= {res}    0.8867
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8288
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0003
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}    9.1596

{txt}{ralign 88:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}  repvotesmajorpercent{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2} .2196497{col 36}{space 2} .6566695{col 47}{space 1}    0.33{col 56}{space 3}0.741{col 64}{space 4} -1.13565{col 77}{space 3} 1.574949
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}            0              99             99 *   {c |} 
        district_fixed {c |}            0             287            287 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}     10.18
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0039
{txt}{col 51}R-squared{col 67}= {res}    0.8879
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8306
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0107
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}    9.1119

{txt}{ralign 78:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}repvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} -.909504{col 26}{space 2} .2850697{col 37}{space 1}   -3.19{col 46}{space 3}0.004{col 54}{space 4}-1.497859{col 67}{space 3} -.321149
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              99             99 *   {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}    24{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}    24{txt})
{res}cum_lncapaci{col 14}{txt}|{col 18}{res}   10.30{col 28}  0.0038{col 37}{txt}|{col 42}{res}   10.73{col 51}  0.0011{col 60}{txt}|{col 65}{res}   10.30

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}12.56  {col 61}{txt}P-val={res}0.0004

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   41.06
Kleibergen-Paap Wald rk F statistic{col 65}   10.30

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}24{txt})={col 49}{res}  10.18{col 61}{txt}P-val={res}0.0039
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}  10.60{col 61}{txt}P-val={res}0.0011
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   5.76{col 61}{txt}P-val={res}0.0164

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}        25
{txt}Number of observations               N  = {res}      1143
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on state_fixed

Number of clusters (state_fixed) = {col 33}{res}    25{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,    24) = {res}   10.79
{txt}{col 55}Prob > F      = {res}  0.0031
{txt}Total (centered) SS     = {res}  63447.0914{txt}{col 55}Centered R2   = {res}  0.8495
{txt}Total (uncentered) SS   = {res}  63447.0914{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res}  84220.8394{txt}{col 55}Root MSE      = {res}   10.55

{txt}{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}  repvotesmajorpercent{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2}-6.970325{col 36}{space 2} 2.122295{col 47}{space 1}   -3.28{col 56}{space 3}0.003{col 64}{space 4}-11.35053{col 77}{space 3}-2.590122
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  12.557
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0004
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  41.059
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  10.300
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncapacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}            0              99             99 *   {c |} 
        district_fixed {c |}            0             287            287 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncount
{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncount_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}     10.26
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0038
{txt}{col 51}R-squared{col 67}= {res}    0.9146
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8710
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0380
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}    0.6226

{txt}{ralign 78:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncoun~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1188998{col 26}{space 2} .0371139{col 37}{space 1}    3.20{col 46}{space 3}0.004{col 54}{space 4} .0423004{col 67}{space 3} .1954992
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              99             99 *   {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}      0.04
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.8353
{txt}{col 51}R-squared{col 67}= {res}    0.8867
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8288
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0001
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}    9.1605

{txt}{ralign 85:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}repvotesmajorperc~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2} .1520435{col 33}{space 2} .7234939{col 44}{space 1}    0.21{col 53}{space 3}0.835{col 61}{space 4}-1.341175{col 74}{space 3} 1.645262
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}            0              99             99 *   {c |} 
     district_fixed {c |}            0             287            287 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,143
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     24{txt}){col 67}= {res}     10.18
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0039
{txt}{col 51}R-squared{col 67}= {res}    0.8879
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8306
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0107
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        25{txt}{col 51}Root MSE{col 67}= {res}    9.1119

{txt}{ralign 78:(Std. Err. adjusted for {res:25} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}repvotesma~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} -.909504{col 26}{space 2} .2850697{col 37}{space 1}   -3.19{col 46}{space 3}0.004{col 54}{space 4}-1.497859{col 67}{space 3} -.321149
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              99             99 *   {c |} 
 district_fixed {c |}            0             287            287 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}    24{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}    24{txt})
{res}cum_lncount_{col 14}{txt}|{col 18}{res}   10.26{col 28}  0.0038{col 37}{txt}|{col 42}{res}   10.69{col 51}  0.0011{col 60}{txt}|{col 65}{res}   10.26

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}13.08  {col 61}{txt}P-val={res}0.0003

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   45.17
Kleibergen-Paap Wald rk F statistic{col 65}   10.26

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}24{txt})={col 49}{res}  10.18{col 61}{txt}P-val={res}0.0039
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}  10.60{col 61}{txt}P-val={res}0.0011
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   5.76{col 61}{txt}P-val={res}0.0164

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}        25
{txt}Number of observations               N  = {res}      1143
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on state_fixed

Number of clusters (state_fixed) = {col 33}{res}    25{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,    24) = {res}   10.12
{txt}{col 55}Prob > F      = {res}  0.0040
{txt}Total (centered) SS     = {res}  63447.0914{txt}{col 55}Centered R2   = {res}  0.8535
{txt}Total (uncentered) SS   = {res}  63447.0914{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 81981.34747{txt}{col 55}Root MSE      = {res}   10.41

{txt}{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}repvotesmajorperc~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2}-7.649333{col 33}{space 2} 2.404446{col 44}{space 1}   -3.18{col 53}{space 3}0.004{col 61}{space 4}-12.61187{col 74}{space 3}  -2.6868
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  13.078
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0003
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  45.169
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  10.263
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncount_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}            0              99             99 *   {c |} 
     district_fixed {c |}            0             287            287 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
capacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 8 singleton observations)
{res}{txt}(converged in 8 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_capacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     23{txt}){col 67}= {res}      5.99
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0225
{txt}{col 51}R-squared{col 67}= {res}    0.7838
{txt}{col 51}Adj R-squared{col 67}= {res}    0.6598
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0991
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        24{txt}{col 51}Root MSE{col 67}= {res}   95.6516

{txt}{ralign 78:(Std. Err. adjusted for {res:24} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_capaci~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 30.39103{col 26}{space 2} 12.41989{col 37}{space 1}    2.45{col 46}{space 3}0.022{col 54}{space 4} 4.698526{col 67}{space 3} 56.08353
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              93             93 *   {c |} 
 district_fixed {c |}            0             285            285 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     23{txt}){col 67}= {res}      0.38
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.5435
{txt}{col 51}R-squared{col 67}= {res}    0.7369
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5860
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0003
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        24{txt}{col 51}Root MSE{col 67}= {res}    8.9945

{txt}{ralign 86:(Std. Err. adjusted for {res:24} clusters in state_fixed)}
{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}incumbvotesmajorpe~t{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}-.0016454{col 34}{space 2} .0026684{col 45}{space 1}   -0.62{col 54}{space 3}0.544{col 62}{space 4}-.0071653{col 75}{space 3} .0038746
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}            0              93             93 *   {c |} 
      district_fixed {c |}            0             285            285 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     23{txt}){col 67}= {res}      0.35
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.5622
{txt}{col 51}R-squared{col 67}= {res}    0.7370
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5861
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0007
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        24{txt}{col 51}Root MSE{col 67}= {res}    8.9927

{txt}{ralign 78:(Std. Err. adjusted for {res:24} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}incumbvote~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .2355517{col 26}{space 2} .4005586{col 37}{space 1}    0.59{col 46}{space 3}0.562{col 54}{space 4}-.5930669{col 67}{space 3}  1.06417
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              93             93 *   {c |} 
 district_fixed {c |}            0             285            285 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}    23{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}    23{txt})
{res}cum_capacity{col 14}{txt}|{col 18}{res}    5.99{col 28}  0.0225{col 37}{txt}|{col 42}{res}    6.25{col 51}  0.0124{col 60}{txt}|{col 65}{res}    5.99

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}7.53   {col 61}{txt}P-val={res}0.0061

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  114.12
Kleibergen-Paap Wald rk F statistic{col 65}    5.99

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}23{txt})={col 49}{res}   0.35{col 61}{txt}P-val={res}0.5622
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.36{col 61}{txt}P-val={res}0.5480
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.41{col 61}{txt}P-val={res}0.5221

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}        24
{txt}Number of observations               N  = {res}      1038
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on state_fixed

Number of clusters (state_fixed) = {col 33}{res}    24{txt}{col 55}Number of obs = {res}    1038
{txt}{col 55}F(  1,    23) = {res}    0.36
{txt}{col 55}Prob > F      = {res}  0.5532
{txt}Total (centered) SS     = {res} 53332.46938{txt}{col 55}Centered R2   = {res}  0.7340
{txt}Total (uncentered) SS   = {res} 53332.46938{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 53905.23774{txt}{col 55}Root MSE      = {res}   9.044

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}incumbvotesmajorpe~t{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2} .0077507{col 34}{space 2} .0128786{col 45}{space 1}    0.60{col 54}{space 3}0.553{col 62}{space 4}-.0188907{col 75}{space 3} .0343921
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   7.527
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0061
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 114.121
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   5.988
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}            0              93             93 *   {c |} 
      district_fixed {c |}            0             285            285 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
count
{err}(running historical version of reghdfe)
{res}{txt}(dropped 8 singleton observations)
{res}{txt}(converged in 8 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_count_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     23{txt}){col 67}= {res}      6.03
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0221
{txt}{col 51}R-squared{col 67}= {res}    0.9873
{txt}{col 51}Adj R-squared{col 67}= {res}    0.9801
{txt}{col 51}Within R-sq.{col 67}= {res}    0.1062
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        24{txt}{col 51}Root MSE{col 67}= {res}   55.8144

{txt}{ralign 78:(Std. Err. adjusted for {res:24} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_count_~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} 18.42254{col 26}{space 2} 7.504438{col 37}{space 1}    2.45{col 46}{space 3}0.022{col 54}{space 4} 2.898423{col 67}{space 3} 33.94665
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              93             93 *   {c |} 
 district_fixed {c |}            0             285            285 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     23{txt}){col 67}= {res}      0.72
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.4054
{txt}{col 51}R-squared{col 67}= {res}    0.7369
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5861
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0006
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        24{txt}{col 51}Root MSE{col 67}= {res}    8.9936

{txt}{ralign 83:(Std. Err. adjusted for {res:24} clusters in state_fixed)}
{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}incumbvotesmajo~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} -.003581{col 31}{space 2} .0042247{col 42}{space 1}   -0.85{col 51}{space 3}0.405{col 59}{space 4}-.0123203{col 72}{space 3} .0051584
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}            0              93             93 *   {c |} 
   district_fixed {c |}            0             285            285 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     23{txt}){col 67}= {res}      0.35
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.5622
{txt}{col 51}R-squared{col 67}= {res}    0.7370
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5861
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0007
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        24{txt}{col 51}Root MSE{col 67}= {res}    8.9927

{txt}{ralign 78:(Std. Err. adjusted for {res:24} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}incumbvote~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .2355517{col 26}{space 2} .4005586{col 37}{space 1}    0.59{col 46}{space 3}0.562{col 54}{space 4}-.5930669{col 67}{space 3}  1.06417
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              93             93 *   {c |} 
 district_fixed {c |}            0             285            285 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}    23{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}    23{txt})
{res}cum_count_tu{col 14}{txt}|{col 18}{res}    6.03{col 28}  0.0221{col 37}{txt}|{col 42}{res}    6.29{col 51}  0.0122{col 60}{txt}|{col 65}{res}    6.03

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}7.08   {col 61}{txt}P-val={res}0.0078

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}  123.16
Kleibergen-Paap Wald rk F statistic{col 65}    6.03

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}23{txt})={col 49}{res}   0.35{col 61}{txt}P-val={res}0.5622
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.36{col 61}{txt}P-val={res}0.5480
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.41{col 61}{txt}P-val={res}0.5221

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}        24
{txt}Number of observations               N  = {res}      1038
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on state_fixed

Number of clusters (state_fixed) = {col 33}{res}    24{txt}{col 55}Number of obs = {res}    1038
{txt}{col 55}F(  1,    23) = {res}    0.36
{txt}{col 55}Prob > F      = {res}  0.5530
{txt}Total (centered) SS     = {res} 53332.46938{txt}{col 55}Centered R2   = {res}  0.7339
{txt}Total (uncentered) SS   = {res} 53332.46938{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 53918.27467{txt}{col 55}Root MSE      = {res}   9.045

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}incumbvotesmajo~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} .0127861{col 31}{space 2} .0212375{col 42}{space 1}    0.60{col 51}{space 3}0.553{col 59}{space 4}-.0311471{col 72}{space 3} .0567192
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   7.080
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0078
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 123.159
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   6.026
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}            0              93             93 *   {c |} 
   district_fixed {c |}            0             285            285 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncapacity
{err}(running historical version of reghdfe)
{res}{txt}(dropped 8 singleton observations)
{res}{txt}(converged in 8 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncapacity_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     23{txt}){col 67}= {res}      7.79
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0104
{txt}{col 51}R-squared{col 67}= {res}    0.8852
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8194
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0309
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        24{txt}{col 51}Root MSE{col 67}= {res}    0.7008

{txt}{ralign 78:(Std. Err. adjusted for {res:24} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncapa~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1198741{col 26}{space 2} .0429425{col 37}{space 1}    2.79{col 46}{space 3}0.010{col 54}{space 4} .0310407{col 67}{space 3} .2087075
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              93             93 *   {c |} 
 district_fixed {c |}            0             285            285 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     23{txt}){col 67}= {res}      0.77
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.3904
{txt}{col 51}R-squared{col 67}= {res}    0.7372
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5865
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0015
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        24{txt}{col 51}Root MSE{col 67}= {res}    8.9893

{txt}{ralign 88:(Std. Err. adjusted for {res:24} clusters in state_fixed)}
{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}incumbvotesmajorperc~t{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2}-.4910827{col 36}{space 2} .5609784{col 47}{space 1}   -0.88{col 56}{space 3}0.390{col 64}{space 4}-1.651555{col 77}{space 3} .6693896
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}            0              93             93 *   {c |} 
        district_fixed {c |}            0             285            285 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     23{txt}){col 67}= {res}      0.35
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.5622
{txt}{col 51}R-squared{col 67}= {res}    0.7370
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5861
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0007
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        24{txt}{col 51}Root MSE{col 67}= {res}    8.9927

{txt}{ralign 78:(Std. Err. adjusted for {res:24} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}incumbvote~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .2355517{col 26}{space 2} .4005586{col 37}{space 1}    0.59{col 46}{space 3}0.562{col 54}{space 4}-.5930669{col 67}{space 3}  1.06417
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              93             93 *   {c |} 
 district_fixed {c |}            0             285            285 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}    23{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}    23{txt})
{res}cum_lncapaci{col 14}{txt}|{col 18}{res}    7.79{col 28}  0.0104{col 37}{txt}|{col 42}{res}    8.13{col 51}  0.0044{col 60}{txt}|{col 65}{res}    7.79

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}11.40  {col 61}{txt}P-val={res}0.0007

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   33.08
Kleibergen-Paap Wald rk F statistic{col 65}    7.79

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}23{txt})={col 49}{res}   0.35{col 61}{txt}P-val={res}0.5622
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.36{col 61}{txt}P-val={res}0.5480
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.41{col 61}{txt}P-val={res}0.5221

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}        24
{txt}Number of observations               N  = {res}      1038
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on state_fixed

Number of clusters (state_fixed) = {col 33}{res}    24{txt}{col 55}Number of obs = {res}    1038
{txt}{col 55}F(  1,    23) = {res}    0.36
{txt}{col 55}Prob > F      = {res}  0.5518
{txt}Total (centered) SS     = {res} 53332.46938{txt}{col 55}Centered R2   = {res}  0.7273
{txt}Total (uncentered) SS   = {res} 53332.46938{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 55266.58519{txt}{col 55}Root MSE      = {res}   9.158

{txt}{hline 23}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 24}{c |}{col 36}    Robust
{col 1}incumbvotesmajorperc~t{col 24}{c |}      Coef.{col 36}   Std. Err.{col 48}      t{col 56}   P>|t|{col 64}     [95% Con{col 77}f. Interval]
{hline 23}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncapacity_turbine {c |}{col 24}{res}{space 2} 1.964993{col 36}{space 2} 3.254077{col 47}{space 1}    0.60{col 56}{space 3}0.552{col 64}{space 4}-4.766578{col 77}{space 3} 8.696564
{txt}{hline 23}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.396
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0007
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  33.076
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   7.792
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncapacity_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 23}{c TT}{hline 49}{c TRC}
           Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 23}{c +}{hline 49}{c RT}
       stateyear_fixed {c |}            0              93             93 *   {c |} 
        district_fixed {c |}            0             285            285 *   {c |} 
{hline 23}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)
lncount
{err}(running historical version of reghdfe)
{res}{txt}(dropped 8 singleton observations)
{res}{txt}(converged in 8 iterations)
{res}
{txt}{inp}{title:Stage: first - cum_lncount_turbine}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     23{txt}){col 67}= {res}      7.91
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.0099
{txt}{col 51}R-squared{col 67}= {res}    0.9208
{txt}{col 51}Adj R-squared{col 67}= {res}    0.8753
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0346
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        24{txt}{col 51}Root MSE{col 67}= {res}    0.6099

{txt}{ralign 78:(Std. Err. adjusted for {res:24} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}cum_lncoun~e{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .1106296{col 26}{space 2}  .039337{col 37}{space 1}    2.81{col 46}{space 3}0.010{col 54}{space 4} .0292548{col 67}{space 3} .1920044
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              93             93 *   {c |} 
 district_fixed {c |}            0             285            285 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: ols}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     23{txt}){col 67}= {res}      0.28
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.6026
{txt}{col 51}R-squared{col 67}= {res}    0.7369
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5860
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0005
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        24{txt}{col 51}Root MSE{col 67}= {res}    8.9937

{txt}{ralign 85:(Std. Err. adjusted for {res:24} clusters in state_fixed)}
{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}incumbvotesmajorp~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2}-.3327064{col 33}{space 2} .6301469{col 44}{space 1}   -0.53{col 53}{space 3}0.603{col 61}{space 4}-1.636265{col 74}{space 3} .9708517
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}            0              93             93 *   {c |} 
     district_fixed {c |}            0             285            285 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: reduced}

{txt}HDFE Linear regression{col 51}Number of obs{col 67}= {res}     1,038
{txt}Absorbing 2 HDFE groups{col 51}F({res}   1{txt},{res}     23{txt}){col 67}= {res}      0.35
{txt}Statistics robust to heteroskedasticity{col 51}Prob > F{col 67}= {res}    0.5622
{txt}{col 51}R-squared{col 67}= {res}    0.7370
{txt}{col 51}Adj R-squared{col 67}= {res}    0.5861
{txt}{col 51}Within R-sq.{col 67}= {res}    0.0007
{txt}{col 1}Number of clusters ({res}state_fixed{txt}) {col 30}= {res}        24{txt}{col 51}Root MSE{col 67}= {res}    8.9927

{txt}{ralign 78:(Std. Err. adjusted for {res:24} clusters in state_fixed)}
{hline 13}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 14}{c |}{col 26}    Robust
{col 1}incumbvote~t{col 14}{c |}      Coef.{col 26}   Std. Err.{col 38}      t{col 46}   P>|t|{col 54}     [95% Con{col 67}f. Interval]
{hline 13}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{space 7}inter {c |}{col 14}{res}{space 2} .2355517{col 26}{space 2} .4005586{col 37}{space 1}    0.59{col 46}{space 3}0.562{col 54}{space 4}-.5930669{col 67}{space 3}  1.06417
{txt}{hline 13}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}

Absorbed degrees of freedom:
{hline 16}{c TT}{hline 49}{c TRC}
    Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 16}{c +}{hline 49}{c RT}
stateyear_fixed {c |}            0              93             93 *   {c |} 
 district_fixed {c |}            0             285            285 *   {c |} 
{hline 16}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}
{txt}{inp}{title:Stage: iv}


{txt}Summary results for first-stage regressions
{hline 43}

{col 44}{help ivreg2##swstats:(Underid)}{col 65}{help ivreg2##swstats:(Weak id)}
Variable     |{col 16}{help ivreg2##swstats:F}({res}{col 17}  1{txt},{res}    23{txt})  P-val{col 37}|{col 39}{help ivreg2##swstats:SW Chi-sq}({res}  1{txt}) P-val{col 60}|{col 62}{help ivreg2##swstats:SW F}({res}{col 67}  1{txt},{res}    23{txt})
{res}cum_lncount_{col 14}{txt}|{col 18}{res}    7.91{col 28}  0.0099{col 37}{txt}|{col 42}{res}    8.25{col 51}  0.0041{col 60}{txt}|{col 65}{res}    7.91

{txt}NB: first-stage test statistics cluster-robust

Stock-Yogo weak ID F test critical values for single endogenous regressor:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for i.i.d. errors only.

{help ivreg2##idtest:Underidentification test}
Ho: matrix of reduced form coefficients has rank=K1-1 (underidentified)
Ha: matrix has rank=K1 (identified)
{res}Kleibergen-Paap rk LM statistic{txt}{col 42}Chi-sq({res}1{txt})={res}11.93  {col 61}{txt}P-val={res}0.0006

{help ivreg2##widtest:Weak identification test}
{txt}Ho: equation is weakly identified
{res}Cragg-Donald Wald F statistic{col 65}   37.19
Kleibergen-Paap Wald rk F statistic{col 65}    7.91

{txt}Stock-Yogo weak ID test critical values for K1=1 and L1=1:
{res}{txt}{col 36}10% maximal IV size{res}{col 67} 16.38
{txt}{col 36}15% maximal IV size{res}{col 67}  8.96
{txt}{col 36}20% maximal IV size{res}{col 67}  6.66
{txt}{col 36}25% maximal IV size{res}{col 67}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.

{help ivreg2##wirobust:Weak-instrument-robust inference}
Tests of joint significance of endogenous regressors B1 in main equation
Ho: B1=0 and orthogonality conditions are valid
{res}Anderson-Rubin Wald test{txt}{col 36}F({res}1{txt},{res}23{txt})={col 49}{res}   0.35{col 61}{txt}P-val={res}0.5622
Anderson-Rubin Wald test{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.36{col 61}{txt}P-val={res}0.5480
Stock-Wright LM S statistic{txt}{col 36}Chi-sq({res}1{txt})={col 49}{res}   0.41{col 61}{txt}P-val={res}0.5221

{txt}NB: Underidentification, weak identification and weak-identification-robust
    test statistics cluster-robust

Number of clusters             N_clust  = {res}        24
{txt}Number of observations               N  = {res}      1038
{txt}Number of regressors                 K  = {res}         1
{txt}Number of endogenous regressors      K1 = {res}         1
{txt}Number of instruments                L  = {res}         1
{txt}Number of excluded instruments       L1 = {res}         1

{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on state_fixed

Number of clusters (state_fixed) = {col 33}{res}    24{txt}{col 55}Number of obs = {res}    1038
{txt}{col 55}F(  1,    23) = {res}    0.38
{txt}{col 55}Prob > F      = {res}  0.5425
{txt}Total (centered) SS     = {res} 53332.46938{txt}{col 55}Centered R2   = {res}  0.7293
{txt}Total (uncentered) SS   = {res} 53332.46938{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 54843.59159{txt}{col 55}Root MSE      = {res}   9.123

{txt}{hline 20}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 21}{c |}{col 33}    Robust
{col 1}incumbvotesmajorp~t{col 21}{c |}      Coef.{col 33}   Std. Err.{col 45}      t{col 53}   P>|t|{col 61}     [95% Con{col 74}f. Interval]
{hline 20}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_lncount_turbine {c |}{col 21}{res}{space 2} 2.129192{col 33}{space 2} 3.443932{col 44}{space 1}    0.62{col 53}{space 3}0.542{col 61}{space 4}-4.995124{col 74}{space 3} 9.253509
{txt}{hline 20}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.934
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0006
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  37.190
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   7.909
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_lncount_turbine
Excluded instruments:{col 23}inter
{hline 78}

Absorbed degrees of freedom:
{hline 20}{c TT}{hline 49}{c TRC}
        Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 20}{c +}{hline 49}{c RT}
    stateyear_fixed {c |}            0              93             93 *   {c |} 
     district_fixed {c |}            0             285            285 *   {c |} 
{hline 20}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}(results {stata estimates replay reghdfe_first1:reghdfe_first1} are active now)
(results {stata estimates replay reghdfe_ols:reghdfe_ols} are active now)
(results {stata estimates replay reghdfe_reduced:reghdfe_reduced} are active now)

{com}. 
. 
. *--------------------- Export LaTeX regression tables -----------------------*
. cd "$rootDir/$resultDir/Tables"
{res}/Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Results/Tables
{txt}
{com}. 
. ** Compare OLS and IV estimates
. * OLS
. esttab dem_capacity_ols dem_count_ols rep_capacity_ols rep_count_ols ///
>                 inc_capacity_ols inc_count_ols using TableA12.tex, booktabs replace ///
>                 refcat(cum_capacity_turbine "\emph{c -(}Panel A: OLS{c )-}", nolabel) ///
>                 b(%9.3f) se noconstant noobs nonotes star(* 0.10 ** 0.05 *** 0.01) ///
>                 varlabels(cum_capacity_turbine "Cumulative capacity (MW)" cum_count_turbine "Cumulative count") varwidth(27) modelwidth(13) ///
>                 mtitles("Model" "Model" "Model" "Model" "Model" "Model") ///
>                 mgroups("Democratic Vote" "Republican Vote" "Incumbent Vote", pattern(1 0 1 0 1 0) prefix(\multicolumn{c -(}@span{c )-}{c -(}c{c )-}{c -(}) suffix({c )-}) span erepeat(\cmidrule(lr){c -(}@span{c )-})) ///
>                 width(\hsize)
{res}{txt}(output written to {browse  `"TableA12.tex"'})

{com}.                 
. * IV
. esttab dem_capacity_iv dem_count_iv rep_capacity_iv rep_count_iv ///
>                 inc_capacity_iv inc_count_iv using TableA12.tex, booktabs append ///
>                 nomtitles se noconstant nonotes legend nonumbers collabels(none) star(* 0.10 ** 0.05 *** 0.01) ///
>                 b(%9.3f) stats(N N_clust r2, labels("Observations" "States" "\(R^{c -(}2{c )-}\)") fmt(0 0 2)) ///
>                 varlabels(cum_capacity_turbine "Cumulative capacity (MW)" cum_count_turbine "Cumulative count") varwidth(27) modelwidth(13) ///
>                 refcat(cum_capacity_turbine "\emph{c -(}Panel B: IV{c )-}", nolabel) ///
>                 width(\hsize)
{res}{txt}(output written to {browse  `"TableA12.tex"'})

{com}. 
.                 
. *------------------ Table A13: Bootstrap Standard Errors ---------------------*
. set seed 12345
{txt}
{com}. 
. local outcome demvotesmajorpercent repvotesmajorpercent incumbvotesmajorpercent // outcome variable 
{txt}
{com}. local endogenous cum_capacity_turbine cum_count_turbine // endogenous variable
{txt}
{com}. local instrument inter // instrument
{txt}
{com}. local admin1_trend stateyear_fixed // geography * time trend
{txt}
{com}. local admin2 district_fixed // panel unit (cluster variable)
{txt}
{com}. local admin3 state_fixed // robustness: state fixed effects     
{txt}
{com}.                         
. foreach y in `outcome' {c -(}
{txt}  2{com}.         // Create outcome variable label for storing estimates
.         local y_name = substr("`y'", 1, 3)
{txt}  3{com}.         
.         foreach x in `endogenous' {c -(}
{txt}  4{com}.                         // Create endogenous variable label for storing estimates
.                         tokenize "`x'", parse("_")
{txt}  5{com}.                         local x_name "`3'"
{txt}  6{com}.                         di "`x_name'"
{txt}  7{com}.                         
.                         // Run IV regression
.                         reghdfe `y' i.stateyear_fixed (`x' = `instrument'), absorb(`admin2') vce(cluster state_fixed) old
{txt}  8{com}.                         
.                         // Store IV estimates
.                         estimates store `y_name'_`x_name'_iv
{txt}  9{com}.                         
.                         boottest `x', ptype(equaltail)
{txt} 10{com}.                 {c )-}
{txt} 11{com}. {c )-}
capacity
{err}(running historical version of reghdfe)
{res}{txt}(converged in 1 iterations)
{res}{err}Warning: estimated covariance matrix of moment conditions not of full rank.
         overidentification statistic not reported, and standard errors and
         model tests should be interpreted with caution.
Possible causes:
         number of clusters insufficient to calculate robust covariance matrix
         singleton dummy variable (dummy with one 1 and N-1 0s or vice versa)
{help ivreg2##partial:partial} option may address problem.
{res}{txt}Warning - collinearities detected
Vars dropped:{col 16}8.stateyear_fixed 12.stateyear_fixed 16.stateyear_fixed
{col 16}20.stateyear_fixed 24.stateyear_fixed 28.stateyear_fixed
{col 16}32.stateyear_fixed 36.stateyear_fixed 40.stateyear_fixed
{col 16}44.stateyear_fixed 48.stateyear_fixed 52.stateyear_fixed
{col 16}56.stateyear_fixed 60.stateyear_fixed 64.stateyear_fixed
{col 16}68.stateyear_fixed 72.stateyear_fixed 76.stateyear_fixed
{col 16}80.stateyear_fixed 84.stateyear_fixed 88.stateyear_fixed
{col 16}92.stateyear_fixed 96.stateyear_fixed 100.stateyear_fixed

HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on state_fixed

Number of clusters (state_fixed) = {col 33}{res}    25{txt}{col 55}Number of obs = {res}    1144
{txt}{col 55}F( 76,    24) = {res}    0.14
{txt}{col 55}Prob > F      = {res}  1.0000
{txt}Total (centered) SS     = {res} 89042.66062{txt}{col 55}Centered R2   = {res}  0.8802
{txt}Total (uncentered) SS   = {res} 89042.66062{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 67093.55543{txt}{col 55}Root MSE      = {res}   9.269

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}demvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2} .0296368{col 34}{space 2} .0113186{col 45}{space 1}    2.62{col 54}{space 3}0.015{col 62}{space 4} .0062764{col 75}{space 3} .0529972
{txt}{space 20} {c |}
{space 5}stateyear_fixed {c |}
{space 18}2  {c |}{col 22}{res}{space 2}   9.9225{col 34}{space 2} 3.47e-15{col 45}{space 1} 2.9e+15{col 54}{space 3}0.000{col 62}{space 4}   9.9225{col 75}{space 3}   9.9225
{txt}{space 18}3  {c |}{col 22}{res}{space 2} 17.29875{col 34}{space 2} 7.00e-15{col 45}{space 1} 2.5e+15{col 54}{space 3}0.000{col 62}{space 4} 17.29875{col 75}{space 3} 17.29875
{txt}{space 18}4  {c |}{col 22}{res}{space 2}  9.73169{col 34}{space 2} .1812387{col 45}{space 1}   53.70{col 54}{space 3}0.000{col 62}{space 4} 9.357632{col 75}{space 3} 10.10575
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{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   7.901
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0049
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 127.772
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   6.409
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{err}Warning: estimated covariance matrix of moment conditions not of full rank.
         overidentification statistic not reported, and standard errors and
         model tests should be interpreted with caution.
Possible causes:
         number of clusters insufficient to calculate robust covariance matrix
         singleton dummy variable (dummy with one 1 and N-1 0s or vice versa)
{help ivreg2##partial:partial} option may address problem.
{txt}{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Included instruments:{col 23}2.stateyear_fixed 3.stateyear_fixed 4.stateyear_fixed
{col 23}5.stateyear_fixed 6.stateyear_fixed 7.stateyear_fixed
{col 23}9.stateyear_fixed 10.stateyear_fixed 11.stateyear_fixed
{col 23}13.stateyear_fixed 14.stateyear_fixed 15.stateyear_fixed
{col 23}17.stateyear_fixed 18.stateyear_fixed 19.stateyear_fixed
{col 23}21.stateyear_fixed 22.stateyear_fixed 23.stateyear_fixed
{col 23}25.stateyear_fixed 26.stateyear_fixed 27.stateyear_fixed
{col 23}29.stateyear_fixed 30.stateyear_fixed 31.stateyear_fixed
{col 23}33.stateyear_fixed 34.stateyear_fixed 35.stateyear_fixed
{col 23}37.stateyear_fixed 38.stateyear_fixed 39.stateyear_fixed
{col 23}41.stateyear_fixed 42.stateyear_fixed 43.stateyear_fixed
{col 23}45.stateyear_fixed 46.stateyear_fixed 47.stateyear_fixed
{col 23}49.stateyear_fixed 50.stateyear_fixed 51.stateyear_fixed
{col 23}53.stateyear_fixed 54.stateyear_fixed 55.stateyear_fixed
{col 23}57.stateyear_fixed 58.stateyear_fixed 59.stateyear_fixed
{col 23}61.stateyear_fixed 62.stateyear_fixed 63.stateyear_fixed
{col 23}65.stateyear_fixed 66.stateyear_fixed 67.stateyear_fixed
{col 23}69.stateyear_fixed 70.stateyear_fixed 71.stateyear_fixed
{col 23}73.stateyear_fixed 74.stateyear_fixed 75.stateyear_fixed
{col 23}77.stateyear_fixed 78.stateyear_fixed 79.stateyear_fixed
{col 23}81.stateyear_fixed 82.stateyear_fixed 83.stateyear_fixed
{col 23}85.stateyear_fixed 86.stateyear_fixed 87.stateyear_fixed
{col 23}89.stateyear_fixed 90.stateyear_fixed 91.stateyear_fixed
{col 23}93.stateyear_fixed 94.stateyear_fixed 95.stateyear_fixed
{col 23}97.stateyear_fixed 98.stateyear_fixed 99.stateyear_fixed
Excluded instruments:{col 23}inter
Dropped collinear:{col 23}8.stateyear_fixed 12.stateyear_fixed 16.stateyear_fixed
{col 23}20.stateyear_fixed 24.stateyear_fixed 28.stateyear_fixed
{col 23}32.stateyear_fixed 36.stateyear_fixed 40.stateyear_fixed
{col 23}44.stateyear_fixed 48.stateyear_fixed 52.stateyear_fixed
{col 23}56.stateyear_fixed 60.stateyear_fixed 64.stateyear_fixed
{col 23}68.stateyear_fixed 72.stateyear_fixed 76.stateyear_fixed
{col 23}80.stateyear_fixed 84.stateyear_fixed 88.stateyear_fixed
{col 23}92.stateyear_fixed 96.stateyear_fixed 100.stateyear_fixed
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}..........................

Wild bootstrap-t, null imposed, 999 replications, Wald test, bootstrap clustering by {res}state_fixed{txt}, Rademacher weights:
  {res}cum_capacity_turbine

{txt}{col 28}t(24) = {res}    2.2045
{col 5}{txt}2 * min(Prob>|t|, Prob<-|t|) = {res}    0.0100

95%{txt} confidence set for null hypothesis expression: [{res}.0102{txt}, {res}.05993{txt}]
{res}count
{err}(running historical version of reghdfe)
{res}{txt}(converged in 1 iterations)
{res}{err}Warning: estimated covariance matrix of moment conditions not of full rank.
         overidentification statistic not reported, and standard errors and
         model tests should be interpreted with caution.
Possible causes:
         number of clusters insufficient to calculate robust covariance matrix
         singleton dummy variable (dummy with one 1 and N-1 0s or vice versa)
{help ivreg2##partial:partial} option may address problem.
{res}{txt}Warning - collinearities detected
Vars dropped:{col 16}8.stateyear_fixed 12.stateyear_fixed 16.stateyear_fixed
{col 16}20.stateyear_fixed 24.stateyear_fixed 28.stateyear_fixed
{col 16}32.stateyear_fixed 36.stateyear_fixed 40.stateyear_fixed
{col 16}44.stateyear_fixed 48.stateyear_fixed 52.stateyear_fixed
{col 16}56.stateyear_fixed 60.stateyear_fixed 64.stateyear_fixed
{col 16}68.stateyear_fixed 72.stateyear_fixed 76.stateyear_fixed
{col 16}80.stateyear_fixed 84.stateyear_fixed 88.stateyear_fixed
{col 16}92.stateyear_fixed 96.stateyear_fixed 100.stateyear_fixed

HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on state_fixed

Number of clusters (state_fixed) = {col 33}{res}    25{txt}{col 55}Number of obs = {res}    1144
{txt}{col 55}F( 76,    24) = {res}    0.14
{txt}{col 55}Prob > F      = {res}  1.0000
{txt}Total (centered) SS     = {res} 89042.66062{txt}{col 55}Centered R2   = {res}  0.8809
{txt}Total (uncentered) SS   = {res} 89042.66062{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 66704.76467{txt}{col 55}Root MSE      = {res}   9.242

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}demvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} .0495348{col 31}{space 2} .0193751{col 42}{space 1}    2.56{col 51}{space 3}0.017{col 59}{space 4} .0095465{col 72}{space 3} .0895231
{txt}{space 17} {c |}
{space 2}stateyear_fixed {c |}
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{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   7.572
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0059
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 134.620
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   6.482
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{err}Warning: estimated covariance matrix of moment conditions not of full rank.
         overidentification statistic not reported, and standard errors and
         model tests should be interpreted with caution.
Possible causes:
         number of clusters insufficient to calculate robust covariance matrix
         singleton dummy variable (dummy with one 1 and N-1 0s or vice versa)
{help ivreg2##partial:partial} option may address problem.
{txt}{hline 78}
Instrumented:{col 23}cum_count_turbine
Included instruments:{col 23}2.stateyear_fixed 3.stateyear_fixed 4.stateyear_fixed
{col 23}5.stateyear_fixed 6.stateyear_fixed 7.stateyear_fixed
{col 23}9.stateyear_fixed 10.stateyear_fixed 11.stateyear_fixed
{col 23}13.stateyear_fixed 14.stateyear_fixed 15.stateyear_fixed
{col 23}17.stateyear_fixed 18.stateyear_fixed 19.stateyear_fixed
{col 23}21.stateyear_fixed 22.stateyear_fixed 23.stateyear_fixed
{col 23}25.stateyear_fixed 26.stateyear_fixed 27.stateyear_fixed
{col 23}29.stateyear_fixed 30.stateyear_fixed 31.stateyear_fixed
{col 23}33.stateyear_fixed 34.stateyear_fixed 35.stateyear_fixed
{col 23}37.stateyear_fixed 38.stateyear_fixed 39.stateyear_fixed
{col 23}41.stateyear_fixed 42.stateyear_fixed 43.stateyear_fixed
{col 23}45.stateyear_fixed 46.stateyear_fixed 47.stateyear_fixed
{col 23}49.stateyear_fixed 50.stateyear_fixed 51.stateyear_fixed
{col 23}53.stateyear_fixed 54.stateyear_fixed 55.stateyear_fixed
{col 23}57.stateyear_fixed 58.stateyear_fixed 59.stateyear_fixed
{col 23}61.stateyear_fixed 62.stateyear_fixed 63.stateyear_fixed
{col 23}65.stateyear_fixed 66.stateyear_fixed 67.stateyear_fixed
{col 23}69.stateyear_fixed 70.stateyear_fixed 71.stateyear_fixed
{col 23}73.stateyear_fixed 74.stateyear_fixed 75.stateyear_fixed
{col 23}77.stateyear_fixed 78.stateyear_fixed 79.stateyear_fixed
{col 23}81.stateyear_fixed 82.stateyear_fixed 83.stateyear_fixed
{col 23}85.stateyear_fixed 86.stateyear_fixed 87.stateyear_fixed
{col 23}89.stateyear_fixed 90.stateyear_fixed 91.stateyear_fixed
{col 23}93.stateyear_fixed 94.stateyear_fixed 95.stateyear_fixed
{col 23}97.stateyear_fixed 98.stateyear_fixed 99.stateyear_fixed
Excluded instruments:{col 23}inter
Dropped collinear:{col 23}8.stateyear_fixed 12.stateyear_fixed 16.stateyear_fixed
{col 23}20.stateyear_fixed 24.stateyear_fixed 28.stateyear_fixed
{col 23}32.stateyear_fixed 36.stateyear_fixed 40.stateyear_fixed
{col 23}44.stateyear_fixed 48.stateyear_fixed 52.stateyear_fixed
{col 23}56.stateyear_fixed 60.stateyear_fixed 64.stateyear_fixed
{col 23}68.stateyear_fixed 72.stateyear_fixed 76.stateyear_fixed
{col 23}80.stateyear_fixed 84.stateyear_fixed 88.stateyear_fixed
{col 23}92.stateyear_fixed 96.stateyear_fixed 100.stateyear_fixed
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}..........................

Wild bootstrap-t, null imposed, 999 replications, Wald test, bootstrap clustering by {res}state_fixed{txt}, Rademacher weights:
  {res}cum_count_turbine

{txt}{col 28}t(24) = {res}    2.1524
{col 5}{txt}2 * min(Prob>|t|, Prob<-|t|) = {res}    0.0020

95%{txt} confidence set for null hypothesis expression: [{res}.01926{txt}, {res}.09978{txt}]
{res}capacity
{err}(running historical version of reghdfe)
{res}{txt}(converged in 1 iterations)
{res}{err}Warning: estimated covariance matrix of moment conditions not of full rank.
         overidentification statistic not reported, and standard errors and
         model tests should be interpreted with caution.
Possible causes:
         number of clusters insufficient to calculate robust covariance matrix
         singleton dummy variable (dummy with one 1 and N-1 0s or vice versa)
{help ivreg2##partial:partial} option may address problem.
{res}{txt}Warning - collinearities detected
Vars dropped:{col 16}8.stateyear_fixed 12.stateyear_fixed 16.stateyear_fixed
{col 16}20.stateyear_fixed 24.stateyear_fixed 28.stateyear_fixed
{col 16}32.stateyear_fixed 36.stateyear_fixed 40.stateyear_fixed
{col 16}44.stateyear_fixed 48.stateyear_fixed 52.stateyear_fixed
{col 16}56.stateyear_fixed 60.stateyear_fixed 64.stateyear_fixed
{col 16}68.stateyear_fixed 72.stateyear_fixed 76.stateyear_fixed
{col 16}80.stateyear_fixed 84.stateyear_fixed 88.stateyear_fixed
{col 16}92.stateyear_fixed 96.stateyear_fixed 100.stateyear_fixed

HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on state_fixed

Number of clusters (state_fixed) = {col 33}{res}    25{txt}{col 55}Number of obs = {res}    1144
{txt}{col 55}F( 76,    24) = {res}    0.14
{txt}{col 55}Prob > F      = {res}  1.0000
{txt}Total (centered) SS     = {res} 89042.66067{txt}{col 55}Centered R2   = {res}  0.8802
{txt}Total (uncentered) SS   = {res} 89042.66067{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 67093.55595{txt}{col 55}Root MSE      = {res}   9.269

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}repvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}-.0296368{col 34}{space 2} .0113186{col 45}{space 1}   -2.62{col 54}{space 3}0.015{col 62}{space 4}-.0529972{col 75}{space 3}-.0062764
{txt}{space 20} {c |}
{space 5}stateyear_fixed {c |}
{space 18}2  {c |}{col 22}{res}{space 2}  -9.9225{col 34}{space 2} 4.21e-15{col 45}{space 1}-2.4e+15{col 54}{space 3}0.000{col 62}{space 4}  -9.9225{col 75}{space 3}  -9.9225
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{txt}{space 18}4  {c |}{col 22}{res}{space 2}-9.731691{col 34}{space 2} .1812387{col 45}{space 1}  -53.70{col 54}{space 3}0.000{col 62}{space 4}-10.10575{col 75}{space 3}-9.357632
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{space 17}13  {c |}{col 22}{res}{space 2} 10.81831{col 34}{space 2} .5041294{col 45}{space 1}   21.46{col 54}{space 3}0.000{col 62}{space 4} 9.777837{col 75}{space 3} 11.85878
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{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   7.901
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0049
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 127.772
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   6.409
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{err}Warning: estimated covariance matrix of moment conditions not of full rank.
         overidentification statistic not reported, and standard errors and
         model tests should be interpreted with caution.
Possible causes:
         number of clusters insufficient to calculate robust covariance matrix
         singleton dummy variable (dummy with one 1 and N-1 0s or vice versa)
{help ivreg2##partial:partial} option may address problem.
{txt}{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Included instruments:{col 23}2.stateyear_fixed 3.stateyear_fixed 4.stateyear_fixed
{col 23}5.stateyear_fixed 6.stateyear_fixed 7.stateyear_fixed
{col 23}9.stateyear_fixed 10.stateyear_fixed 11.stateyear_fixed
{col 23}13.stateyear_fixed 14.stateyear_fixed 15.stateyear_fixed
{col 23}17.stateyear_fixed 18.stateyear_fixed 19.stateyear_fixed
{col 23}21.stateyear_fixed 22.stateyear_fixed 23.stateyear_fixed
{col 23}25.stateyear_fixed 26.stateyear_fixed 27.stateyear_fixed
{col 23}29.stateyear_fixed 30.stateyear_fixed 31.stateyear_fixed
{col 23}33.stateyear_fixed 34.stateyear_fixed 35.stateyear_fixed
{col 23}37.stateyear_fixed 38.stateyear_fixed 39.stateyear_fixed
{col 23}41.stateyear_fixed 42.stateyear_fixed 43.stateyear_fixed
{col 23}45.stateyear_fixed 46.stateyear_fixed 47.stateyear_fixed
{col 23}49.stateyear_fixed 50.stateyear_fixed 51.stateyear_fixed
{col 23}53.stateyear_fixed 54.stateyear_fixed 55.stateyear_fixed
{col 23}57.stateyear_fixed 58.stateyear_fixed 59.stateyear_fixed
{col 23}61.stateyear_fixed 62.stateyear_fixed 63.stateyear_fixed
{col 23}65.stateyear_fixed 66.stateyear_fixed 67.stateyear_fixed
{col 23}69.stateyear_fixed 70.stateyear_fixed 71.stateyear_fixed
{col 23}73.stateyear_fixed 74.stateyear_fixed 75.stateyear_fixed
{col 23}77.stateyear_fixed 78.stateyear_fixed 79.stateyear_fixed
{col 23}81.stateyear_fixed 82.stateyear_fixed 83.stateyear_fixed
{col 23}85.stateyear_fixed 86.stateyear_fixed 87.stateyear_fixed
{col 23}89.stateyear_fixed 90.stateyear_fixed 91.stateyear_fixed
{col 23}93.stateyear_fixed 94.stateyear_fixed 95.stateyear_fixed
{col 23}97.stateyear_fixed 98.stateyear_fixed 99.stateyear_fixed
Excluded instruments:{col 23}inter
Dropped collinear:{col 23}8.stateyear_fixed 12.stateyear_fixed 16.stateyear_fixed
{col 23}20.stateyear_fixed 24.stateyear_fixed 28.stateyear_fixed
{col 23}32.stateyear_fixed 36.stateyear_fixed 40.stateyear_fixed
{col 23}44.stateyear_fixed 48.stateyear_fixed 52.stateyear_fixed
{col 23}56.stateyear_fixed 60.stateyear_fixed 64.stateyear_fixed
{col 23}68.stateyear_fixed 72.stateyear_fixed 76.stateyear_fixed
{col 23}80.stateyear_fixed 84.stateyear_fixed 88.stateyear_fixed
{col 23}92.stateyear_fixed 96.stateyear_fixed 100.stateyear_fixed
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}..........................

Wild bootstrap-t, null imposed, 999 replications, Wald test, bootstrap clustering by {res}state_fixed{txt}, Rademacher weights:
  {res}cum_capacity_turbine

{txt}{col 28}t(24) = {res}   -2.2045
{col 5}{txt}2 * min(Prob>|t|, Prob<-|t|) = {res}    0.0000

95%{txt} confidence set for null hypothesis expression: [{res}-.05762{txt}, {res}-.01072{txt}]
{res}count
{err}(running historical version of reghdfe)
{res}{txt}(converged in 1 iterations)
{res}{err}Warning: estimated covariance matrix of moment conditions not of full rank.
         overidentification statistic not reported, and standard errors and
         model tests should be interpreted with caution.
Possible causes:
         number of clusters insufficient to calculate robust covariance matrix
         singleton dummy variable (dummy with one 1 and N-1 0s or vice versa)
{help ivreg2##partial:partial} option may address problem.
{res}{txt}Warning - collinearities detected
Vars dropped:{col 16}8.stateyear_fixed 12.stateyear_fixed 16.stateyear_fixed
{col 16}20.stateyear_fixed 24.stateyear_fixed 28.stateyear_fixed
{col 16}32.stateyear_fixed 36.stateyear_fixed 40.stateyear_fixed
{col 16}44.stateyear_fixed 48.stateyear_fixed 52.stateyear_fixed
{col 16}56.stateyear_fixed 60.stateyear_fixed 64.stateyear_fixed
{col 16}68.stateyear_fixed 72.stateyear_fixed 76.stateyear_fixed
{col 16}80.stateyear_fixed 84.stateyear_fixed 88.stateyear_fixed
{col 16}92.stateyear_fixed 96.stateyear_fixed 100.stateyear_fixed

HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on state_fixed

Number of clusters (state_fixed) = {col 33}{res}    25{txt}{col 55}Number of obs = {res}    1144
{txt}{col 55}F( 76,    24) = {res}    0.14
{txt}{col 55}Prob > F      = {res}  1.0000
{txt}Total (centered) SS     = {res} 89042.66067{txt}{col 55}Centered R2   = {res}  0.8809
{txt}Total (uncentered) SS   = {res} 89042.66067{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 66704.76519{txt}{col 55}Root MSE      = {res}   9.242

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}repvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
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{space 2}stateyear_fixed {c |}
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{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   7.572
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0059
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 134.620
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   6.482
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{err}Warning: estimated covariance matrix of moment conditions not of full rank.
         overidentification statistic not reported, and standard errors and
         model tests should be interpreted with caution.
Possible causes:
         number of clusters insufficient to calculate robust covariance matrix
         singleton dummy variable (dummy with one 1 and N-1 0s or vice versa)
{help ivreg2##partial:partial} option may address problem.
{txt}{hline 78}
Instrumented:{col 23}cum_count_turbine
Included instruments:{col 23}2.stateyear_fixed 3.stateyear_fixed 4.stateyear_fixed
{col 23}5.stateyear_fixed 6.stateyear_fixed 7.stateyear_fixed
{col 23}9.stateyear_fixed 10.stateyear_fixed 11.stateyear_fixed
{col 23}13.stateyear_fixed 14.stateyear_fixed 15.stateyear_fixed
{col 23}17.stateyear_fixed 18.stateyear_fixed 19.stateyear_fixed
{col 23}21.stateyear_fixed 22.stateyear_fixed 23.stateyear_fixed
{col 23}25.stateyear_fixed 26.stateyear_fixed 27.stateyear_fixed
{col 23}29.stateyear_fixed 30.stateyear_fixed 31.stateyear_fixed
{col 23}33.stateyear_fixed 34.stateyear_fixed 35.stateyear_fixed
{col 23}37.stateyear_fixed 38.stateyear_fixed 39.stateyear_fixed
{col 23}41.stateyear_fixed 42.stateyear_fixed 43.stateyear_fixed
{col 23}45.stateyear_fixed 46.stateyear_fixed 47.stateyear_fixed
{col 23}49.stateyear_fixed 50.stateyear_fixed 51.stateyear_fixed
{col 23}53.stateyear_fixed 54.stateyear_fixed 55.stateyear_fixed
{col 23}57.stateyear_fixed 58.stateyear_fixed 59.stateyear_fixed
{col 23}61.stateyear_fixed 62.stateyear_fixed 63.stateyear_fixed
{col 23}65.stateyear_fixed 66.stateyear_fixed 67.stateyear_fixed
{col 23}69.stateyear_fixed 70.stateyear_fixed 71.stateyear_fixed
{col 23}73.stateyear_fixed 74.stateyear_fixed 75.stateyear_fixed
{col 23}77.stateyear_fixed 78.stateyear_fixed 79.stateyear_fixed
{col 23}81.stateyear_fixed 82.stateyear_fixed 83.stateyear_fixed
{col 23}85.stateyear_fixed 86.stateyear_fixed 87.stateyear_fixed
{col 23}89.stateyear_fixed 90.stateyear_fixed 91.stateyear_fixed
{col 23}93.stateyear_fixed 94.stateyear_fixed 95.stateyear_fixed
{col 23}97.stateyear_fixed 98.stateyear_fixed 99.stateyear_fixed
Excluded instruments:{col 23}inter
Dropped collinear:{col 23}8.stateyear_fixed 12.stateyear_fixed 16.stateyear_fixed
{col 23}20.stateyear_fixed 24.stateyear_fixed 28.stateyear_fixed
{col 23}32.stateyear_fixed 36.stateyear_fixed 40.stateyear_fixed
{col 23}44.stateyear_fixed 48.stateyear_fixed 52.stateyear_fixed
{col 23}56.stateyear_fixed 60.stateyear_fixed 64.stateyear_fixed
{col 23}68.stateyear_fixed 72.stateyear_fixed 76.stateyear_fixed
{col 23}80.stateyear_fixed 84.stateyear_fixed 88.stateyear_fixed
{col 23}92.stateyear_fixed 96.stateyear_fixed 100.stateyear_fixed
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}..........................

Wild bootstrap-t, null imposed, 999 replications, Wald test, bootstrap clustering by {res}state_fixed{txt}, Rademacher weights:
  {res}cum_count_turbine

{txt}{col 28}t(24) = {res}   -2.1524
{col 5}{txt}2 * min(Prob>|t|, Prob<-|t|) = {res}    0.0040

95%{txt} confidence set for null hypothesis expression: [{res}-.09908{txt}, {res}-.01382{txt}]
{res}capacity
{err}(running historical version of reghdfe)
{res}{txt}(converged in 1 iterations)
{res}{err}Warning: estimated covariance matrix of moment conditions not of full rank.
         overidentification statistic not reported, and standard errors and
         model tests should be interpreted with caution.
Possible causes:
         number of clusters insufficient to calculate robust covariance matrix
         singleton dummy variable (dummy with one 1 and N-1 0s or vice versa)
{help ivreg2##partial:partial} option may address problem.
{res}{txt}Warning - collinearities detected
Vars dropped:{col 16}8.stateyear_fixed 12.stateyear_fixed 16.stateyear_fixed
{col 16}20.stateyear_fixed 24.stateyear_fixed 28.stateyear_fixed
{col 16}32.stateyear_fixed 36.stateyear_fixed 40.stateyear_fixed
{col 16}44.stateyear_fixed 48.stateyear_fixed 52.stateyear_fixed
{col 16}56.stateyear_fixed 60.stateyear_fixed 64.stateyear_fixed
{col 16}68.stateyear_fixed 72.stateyear_fixed 76.stateyear_fixed
{col 16}80.stateyear_fixed 84.stateyear_fixed 88.stateyear_fixed
{col 16}92.stateyear_fixed 96.stateyear_fixed 100.stateyear_fixed

HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on state_fixed

Number of clusters (state_fixed) = {col 33}{res}    25{txt}{col 55}Number of obs = {res}    1046
{txt}{col 55}F( 76,    24) = {res}    0.02
{txt}{col 55}Prob > F      = {res}  1.0000
{txt}Total (centered) SS     = {res} 71235.97312{txt}{col 55}Centered R2   = {res}  0.7352
{txt}Total (uncentered) SS   = {res} 71235.97312{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 53905.23774{txt}{col 55}Root MSE      = {res}   8.884

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}incumbvotesmajorpe~t{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
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{txt}{space 20} {c |}
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{space 17}97  {c |}{col 22}{res}{space 2} 9.219203{col 34}{space 2} .8334882{col 45}{space 1}   11.06{col 54}{space 3}0.000{col 62}{space 4} 7.498968{col 75}{space 3} 10.93944
{txt}{space 17}98  {c |}{col 22}{res}{space 2} 5.446309{col 34}{space 2} .8000065{col 45}{space 1}    6.81{col 54}{space 3}0.000{col 62}{space 4} 3.795176{col 75}{space 3} 7.097441
{txt}{space 17}99  {c |}{col 22}{res}{space 2} 9.949226{col 34}{space 2} .1477774{col 45}{space 1}   67.33{col 54}{space 3}0.000{col 62}{space 4} 9.644229{col 75}{space 3} 10.25422
{txt}{space 16}100  {c |}{col 22}{res}{space 2}        0{col 34}{txt}  (empty)
{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   7.527
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0061
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 106.748
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   5.568
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{err}Warning: estimated covariance matrix of moment conditions not of full rank.
         overidentification statistic not reported, and standard errors and
         model tests should be interpreted with caution.
Possible causes:
         number of clusters insufficient to calculate robust covariance matrix
         singleton dummy variable (dummy with one 1 and N-1 0s or vice versa)
{help ivreg2##partial:partial} option may address problem.
{txt}{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Included instruments:{col 23}2.stateyear_fixed 3.stateyear_fixed 4.stateyear_fixed
{col 23}5.stateyear_fixed 6.stateyear_fixed 7.stateyear_fixed
{col 23}9.stateyear_fixed 10.stateyear_fixed 11.stateyear_fixed
{col 23}13.stateyear_fixed 14.stateyear_fixed 15.stateyear_fixed
{col 23}17.stateyear_fixed 18.stateyear_fixed 19.stateyear_fixed
{col 23}21.stateyear_fixed 22.stateyear_fixed 23.stateyear_fixed
{col 23}25.stateyear_fixed 26.stateyear_fixed 27.stateyear_fixed
{col 23}29.stateyear_fixed 30.stateyear_fixed 31.stateyear_fixed
{col 23}33.stateyear_fixed 34.stateyear_fixed 35.stateyear_fixed
{col 23}37.stateyear_fixed 38.stateyear_fixed 39.stateyear_fixed
{col 23}41.stateyear_fixed 42.stateyear_fixed 43.stateyear_fixed
{col 23}45.stateyear_fixed 46.stateyear_fixed 47.stateyear_fixed
{col 23}49.stateyear_fixed 50.stateyear_fixed 51.stateyear_fixed
{col 23}53.stateyear_fixed 54.stateyear_fixed 55.stateyear_fixed
{col 23}57.stateyear_fixed 58.stateyear_fixed 59.stateyear_fixed
{col 23}61.stateyear_fixed 62.stateyear_fixed 63.stateyear_fixed
{col 23}65.stateyear_fixed 66.stateyear_fixed 67.stateyear_fixed
{col 23}69.stateyear_fixed 70.stateyear_fixed 71.stateyear_fixed
{col 23}73.stateyear_fixed 74.stateyear_fixed 75.stateyear_fixed
{col 23}77.stateyear_fixed 78.stateyear_fixed 79.stateyear_fixed
{col 23}81.stateyear_fixed 82.stateyear_fixed 83.stateyear_fixed
{col 23}85.stateyear_fixed 86.stateyear_fixed 87.stateyear_fixed
{col 23}89.stateyear_fixed 90.stateyear_fixed 91.stateyear_fixed
{col 23}93.stateyear_fixed 94.stateyear_fixed 95.stateyear_fixed
{col 23}97.stateyear_fixed 98.stateyear_fixed 99.stateyear_fixed
Excluded instruments:{col 23}inter
Dropped collinear:{col 23}8.stateyear_fixed 12.stateyear_fixed 16.stateyear_fixed
{col 23}20.stateyear_fixed 24.stateyear_fixed 28.stateyear_fixed
{col 23}32.stateyear_fixed 36.stateyear_fixed 40.stateyear_fixed
{col 23}44.stateyear_fixed 48.stateyear_fixed 52.stateyear_fixed
{col 23}56.stateyear_fixed 60.stateyear_fixed 64.stateyear_fixed
{col 23}68.stateyear_fixed 72.stateyear_fixed 76.stateyear_fixed
{col 23}80.stateyear_fixed 84.stateyear_fixed 88.stateyear_fixed
{col 23}92.stateyear_fixed 96.stateyear_fixed 100.stateyear_fixed
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}..........................

Wild bootstrap-t, null imposed, 999 replications, Wald test, bootstrap clustering by {res}state_fixed{txt}, Rademacher weights:
  {res}cum_capacity_turbine

{txt}{col 28}t(24) = {res}    0.4783
{col 5}{txt}2 * min(Prob>|t|, Prob<-|t|) = {res}    0.5906

95%{txt} confidence set for null hypothesis expression: [{res}-.01544{txt}, {res}.06219{txt}]
{res}count
{err}(running historical version of reghdfe)
{res}{txt}(converged in 1 iterations)
{res}{err}Warning: estimated covariance matrix of moment conditions not of full rank.
         overidentification statistic not reported, and standard errors and
         model tests should be interpreted with caution.
Possible causes:
         number of clusters insufficient to calculate robust covariance matrix
         singleton dummy variable (dummy with one 1 and N-1 0s or vice versa)
{help ivreg2##partial:partial} option may address problem.
{res}{txt}Warning - collinearities detected
Vars dropped:{col 16}8.stateyear_fixed 12.stateyear_fixed 16.stateyear_fixed
{col 16}20.stateyear_fixed 24.stateyear_fixed 28.stateyear_fixed
{col 16}32.stateyear_fixed 36.stateyear_fixed 40.stateyear_fixed
{col 16}44.stateyear_fixed 48.stateyear_fixed 52.stateyear_fixed
{col 16}56.stateyear_fixed 60.stateyear_fixed 64.stateyear_fixed
{col 16}68.stateyear_fixed 72.stateyear_fixed 76.stateyear_fixed
{col 16}80.stateyear_fixed 84.stateyear_fixed 88.stateyear_fixed
{col 16}92.stateyear_fixed 96.stateyear_fixed 100.stateyear_fixed

HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on state_fixed

Number of clusters (state_fixed) = {col 33}{res}    25{txt}{col 55}Number of obs = {res}    1046
{txt}{col 55}F( 76,    24) = {res}    0.00
{txt}{col 55}Prob > F      = {res}  1.0000
{txt}Total (centered) SS     = {res} 71235.97312{txt}{col 55}Centered R2   = {res}  0.7352
{txt}Total (uncentered) SS   = {res} 71235.97312{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 53918.27467{txt}{col 55}Root MSE      = {res}   8.885

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}incumbvotesmajo~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} .0127861{col 31}{space 2} .0220241{col 42}{space 1}    0.58{col 51}{space 3}0.567{col 59}{space 4}-.0326695{col 72}{space 3} .0582416
{txt}{space 17} {c |}
{space 2}stateyear_fixed {c |}
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{space 14}77  {c |}{col 19}{res}{space 2} 1.757507{col 31}{space 2} 4.539605{col 42}{space 1}    0.39{col 51}{space 3}0.702{col 59}{space 4}-7.611776{col 72}{space 3} 11.12679
{txt}{space 14}78  {c |}{col 19}{res}{space 2}-14.04858{col 31}{space 2} 2.659413{col 42}{space 1}   -5.28{col 51}{space 3}0.000{col 59}{space 4}-19.53734{col 72}{space 3}-8.559825
{txt}{space 14}79  {c |}{col 19}{res}{space 2}-10.79322{col 31}{space 2} 2.202705{col 42}{space 1}   -4.90{col 51}{space 3}0.000{col 59}{space 4}-15.33938{col 72}{space 3}-6.247058
{txt}{space 14}80  {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (empty)
{space 14}81  {c |}{col 19}{res}{space 2} 4.977341{col 31}{space 2} 4.453277{col 42}{space 1}    1.12{col 51}{space 3}0.275{col 59}{space 4}-4.213771{col 72}{space 3} 14.16845
{txt}{space 14}82  {c |}{col 19}{res}{space 2} 5.234148{col 31}{space 2} 3.937913{col 42}{space 1}    1.33{col 51}{space 3}0.196{col 59}{space 4}-2.893304{col 72}{space 3}  13.3616
{txt}{space 14}83  {c |}{col 19}{res}{space 2} 23.94792{col 31}{space 2} 2.229942{col 42}{space 1}   10.74{col 51}{space 3}0.000{col 59}{space 4} 19.34555{col 72}{space 3}  28.5503
{txt}{space 14}84  {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (empty)
{space 14}85  {c |}{col 19}{res}{space 2} 16.53563{col 31}{space 2}  .454583{col 42}{space 1}   36.38{col 51}{space 3}0.000{col 59}{space 4} 15.59741{col 72}{space 3} 17.47384
{txt}{space 14}86  {c |}{col 19}{res}{space 2} 2.029573{col 31}{space 2} .4079921{col 42}{space 1}    4.97{col 51}{space 3}0.000{col 59}{space 4} 1.187519{col 72}{space 3} 2.871627
{txt}{space 14}87  {c |}{col 19}{res}{space 2}  3.29926{col 31}{space 2} .2287032{col 42}{space 1}   14.43{col 51}{space 3}0.000{col 59}{space 4}  2.82724{col 72}{space 3}  3.77128
{txt}{space 14}88  {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (empty)
{space 14}89  {c |}{col 19}{res}{space 2}     5.43{col 31}{space 2} 3.11e-15{col 42}{space 1} 1.7e+15{col 51}{space 3}0.000{col 59}{space 4}     5.43{col 72}{space 3}     5.43
{txt}{space 14}90  {c |}{col 19}{res}{space 2}   3.5825{col 31}{space 2} 5.32e-15{col 42}{space 1} 6.7e+14{col 51}{space 3}0.000{col 59}{space 4}   3.5825{col 72}{space 3}   3.5825
{txt}{space 14}91  {c |}{col 19}{res}{space 2}  12.8675{col 31}{space 2} 3.34e-15{col 42}{space 1} 3.9e+15{col 51}{space 3}0.000{col 59}{space 4}  12.8675{col 72}{space 3}  12.8675
{txt}{space 14}92  {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (empty)
{space 14}93  {c |}{col 19}{res}{space 2} 3.333039{col 31}{space 2} 2.584368{col 42}{space 1}    1.29{col 51}{space 3}0.209{col 59}{space 4}-2.000834{col 72}{space 3} 8.666913
{txt}{space 14}94  {c |}{col 19}{res}{space 2} 2.897655{col 31}{space 2} 1.786801{col 42}{space 1}    1.62{col 51}{space 3}0.118{col 59}{space 4}-.7901203{col 72}{space 3}  6.58543
{txt}{space 14}95  {c |}{col 19}{res}{space 2} 3.478207{col 31}{space 2}  1.12363{col 42}{space 1}    3.10{col 51}{space 3}0.005{col 59}{space 4} 1.159149{col 72}{space 3} 5.797265
{txt}{space 14}96  {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (empty)
{space 14}97  {c |}{col 19}{res}{space 2} 9.237994{col 31}{space 2} .8655479{col 42}{space 1}   10.67{col 51}{space 3}0.000{col 59}{space 4} 7.451591{col 72}{space 3}  11.0244
{txt}{space 14}98  {c |}{col 19}{res}{space 2} 5.469009{col 31}{space 2} .8388126{col 42}{space 1}    6.52{col 51}{space 3}0.000{col 59}{space 4} 3.737784{col 72}{space 3} 7.200233
{txt}{space 14}99  {c |}{col 19}{res}{space 2} 9.957722{col 31}{space 2} .1623575{col 42}{space 1}   61.33{col 51}{space 3}0.000{col 59}{space 4} 9.622633{col 72}{space 3} 10.29281
{txt}{space 13}100  {c |}{col 19}{res}{space 2}        0{col 31}{txt}  (empty)
{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}   7.080
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0078
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 115.202
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}   5.604
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{err}Warning: estimated covariance matrix of moment conditions not of full rank.
         overidentification statistic not reported, and standard errors and
         model tests should be interpreted with caution.
Possible causes:
         number of clusters insufficient to calculate robust covariance matrix
         singleton dummy variable (dummy with one 1 and N-1 0s or vice versa)
{help ivreg2##partial:partial} option may address problem.
{txt}{hline 78}
Instrumented:{col 23}cum_count_turbine
Included instruments:{col 23}2.stateyear_fixed 3.stateyear_fixed 4.stateyear_fixed
{col 23}5.stateyear_fixed 6.stateyear_fixed 7.stateyear_fixed
{col 23}9.stateyear_fixed 10.stateyear_fixed 11.stateyear_fixed
{col 23}13.stateyear_fixed 14.stateyear_fixed 15.stateyear_fixed
{col 23}17.stateyear_fixed 18.stateyear_fixed 19.stateyear_fixed
{col 23}21.stateyear_fixed 22.stateyear_fixed 23.stateyear_fixed
{col 23}25.stateyear_fixed 26.stateyear_fixed 27.stateyear_fixed
{col 23}29.stateyear_fixed 30.stateyear_fixed 31.stateyear_fixed
{col 23}33.stateyear_fixed 34.stateyear_fixed 35.stateyear_fixed
{col 23}37.stateyear_fixed 38.stateyear_fixed 39.stateyear_fixed
{col 23}41.stateyear_fixed 42.stateyear_fixed 43.stateyear_fixed
{col 23}45.stateyear_fixed 46.stateyear_fixed 47.stateyear_fixed
{col 23}49.stateyear_fixed 50.stateyear_fixed 51.stateyear_fixed
{col 23}53.stateyear_fixed 54.stateyear_fixed 55.stateyear_fixed
{col 23}57.stateyear_fixed 58.stateyear_fixed 59.stateyear_fixed
{col 23}61.stateyear_fixed 62.stateyear_fixed 63.stateyear_fixed
{col 23}65.stateyear_fixed 66.stateyear_fixed 67.stateyear_fixed
{col 23}69.stateyear_fixed 70.stateyear_fixed 71.stateyear_fixed
{col 23}73.stateyear_fixed 74.stateyear_fixed 75.stateyear_fixed
{col 23}77.stateyear_fixed 78.stateyear_fixed 79.stateyear_fixed
{col 23}81.stateyear_fixed 82.stateyear_fixed 83.stateyear_fixed
{col 23}85.stateyear_fixed 86.stateyear_fixed 87.stateyear_fixed
{col 23}89.stateyear_fixed 90.stateyear_fixed 91.stateyear_fixed
{col 23}93.stateyear_fixed 94.stateyear_fixed 95.stateyear_fixed
{col 23}97.stateyear_fixed 98.stateyear_fixed 99.stateyear_fixed
Excluded instruments:{col 23}inter
Dropped collinear:{col 23}8.stateyear_fixed 12.stateyear_fixed 16.stateyear_fixed
{col 23}20.stateyear_fixed 24.stateyear_fixed 28.stateyear_fixed
{col 23}32.stateyear_fixed 36.stateyear_fixed 40.stateyear_fixed
{col 23}44.stateyear_fixed 48.stateyear_fixed 52.stateyear_fixed
{col 23}56.stateyear_fixed 60.stateyear_fixed 64.stateyear_fixed
{col 23}68.stateyear_fixed 72.stateyear_fixed 76.stateyear_fixed
{col 23}80.stateyear_fixed 84.stateyear_fixed 88.stateyear_fixed
{col 23}92.stateyear_fixed 96.stateyear_fixed 100.stateyear_fixed
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}..........................

Wild bootstrap-t, null imposed, 999 replications, Wald test, bootstrap clustering by {res}state_fixed{txt}, Rademacher weights:
  {res}cum_count_turbine

{txt}{col 28}t(24) = {res}    0.4785
{col 5}{txt}2 * min(Prob>|t|, Prob<-|t|) = {res}    0.5345

95%{txt} confidence set for null hypothesis expression: [{res}-.02526{txt}, {res}.0948{txt}]
{res}{txt}
{com}. 
.                 
. *******************************************************************************
. /*                                                    TABLE A18                                                              */
. *******************************************************************************
. cd "$rootDir/$dataDir/Final"
{res}/Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Data/Final
{txt}
{com}. 
. ** Load election district panel
. use election_district_panel.dta, clear
{txt}
{com}. 
. 
. ** Calculate national wind turbine installation by year
. preserve
{txt}
{com}. collapse (sum) count_turbine capacity_turbine, by(year)
{txt}
{com}. rename count_turbine us_count_turbine
{res}{txt}
{com}. rename capacity_turbine us_capacity_turbine
{res}{txt}
{com}. tempfile sum_year_turbines
{txt}
{com}. save `sum_year_turbines' 
{txt}file /var/folders/_f/x8dz1_dj3638fvxqmsqg5pzw0000gn/T//S_24655.000002 saved

{com}. restore
{txt}
{com}. 
. 
. ** Merge w/t panel 
. capture drop _merge
{txt}
{com}. merge m:1 year using `sum_year_turbines' 
{res}
{txt}{col 5}Result{col 38}# of obs.
{col 5}{hline 41}
{col 5}not matched{col 30}{res}               0
{txt}{col 5}matched{col 30}{res}           1,144{txt}  (_merge==3)
{col 5}{hline 41}

{com}. order us_count_turbine us_capacity_turbine, before(count_turbine)
{txt}
{com}. 
. ** Create instrument and fixed effects
. gen t = year - 2004
{txt}
{com}. gen inter = t * mean_wp
{txt}
{com}. gen bartik_iv_capacity = us_capacity_turbine * mean_wp
{txt}
{com}. gen bartik_iv_count = us_count_turbine * mean_wp
{txt}
{com}. 
. egen stateyear_fixed = group(state year)
{txt}
{com}. egen district_fixed = group(state district)
{txt}
{com}. egen state_fixed = group(state)
{txt}
{com}. 
. gen cum_lncapacity_turbine = log(cum_capacity_turbine + 1)
{txt}
{com}. gen cum_lncount_turbine = log(cum_count_turbine +1 )
{txt}
{com}. 
. 
. foreach var in capacity count {c -(}
{txt}  2{com}. 
. * incumbent
. reghdfe incumbvotes (cum_capacity_turbine=bartik_iv_`var'), absorb(stateyear_fixed district_fixed) vce(cluster district_fixed) old
{txt}  3{com}. estimates store inc_capacity_b`var'
{txt}  4{com}. 
. reghdfe incumbvotes (cum_count_turbine=bartik_iv_`var'), absorb(stateyear_fixed district_fixed) vce(cluster district_fixed) old
{txt}  5{com}. estimates store inc_count_b`var'
{txt}  6{com}. 
. ** dem
. reghdfe demvotesmajor (cum_capacity_turbine=bartik_iv_`var'), absorb(stateyear_fixed district_fixed) vce(cluster district_fixed) old
{txt}  7{com}. estimates store dem_capacity_b`var'
{txt}  8{com}. 
. reghdfe demvotesmajor (cum_count_turbine=bartik_iv_`var'), absorb(stateyear_fixed district_fixed) vce(cluster district_fixed) old
{txt}  9{com}. estimates store dem_count_b`var'
{txt} 10{com}. 
. ** rep
. reghdfe repvotesmajor (cum_capacity_turbine=bartik_iv_`var'), absorb(stateyear_fixed district_fixed) vce(cluster district_fixed) old
{txt} 11{com}. estimates store rep_capacity_b`var'
{txt} 12{com}. 
. reghdfe repvotesmajor (cum_count_turbine=bartik_iv_`var'), absorb(stateyear_fixed district_fixed) vce(cluster district_fixed) old
{txt} 13{com}. estimates store rep_count_b`var'
{txt} 14{com}. {c )-}
{err}(running historical version of reghdfe)
{res}{txt}(dropped 8 singleton observations)
{res}{txt}(converged in 8 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   285{txt}{col 55}Number of obs = {res}    1038
{txt}{col 55}F(  1,   284) = {res}    0.25
{txt}{col 55}Prob > F      = {res}  0.6145
{txt}Total (centered) SS     = {res} 53332.46938{txt}{col 55}Centered R2   = {res}  0.7347
{txt}Total (uncentered) SS   = {res} 53332.46938{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res}  53764.9326{txt}{col 55}Root MSE      = {res}   9.032

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}incumbvotesmajorpe~t{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2} .0065597{col 34}{space 2}  .013008{col 45}{space 1}    0.50{col 54}{space 3}0.614{col 62}{space 4}-.0190447{col 75}{space 3}  .032164
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.762
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0006
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  93.245
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  13.474
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}bartik_iv_capacity
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           93              93              0     {c |} 
      district_fixed {c |}            0             285            285 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 8 singleton observations)
{res}{txt}(converged in 8 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   285{txt}{col 55}Number of obs = {res}    1038
{txt}{col 55}F(  1,   284) = {res}    0.25
{txt}{col 55}Prob > F      = {res}  0.6151
{txt}Total (centered) SS     = {res} 53332.46938{txt}{col 55}Centered R2   = {res}  0.7346
{txt}Total (uncentered) SS   = {res} 53332.46938{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 53772.67309{txt}{col 55}Root MSE      = {res}   9.033

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}incumbvotesmajo~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} .0107189{col 31}{space 2} .0212933{col 42}{space 1}    0.50{col 51}{space 3}0.615{col 59}{space 4}-.0311939{col 72}{space 3} .0526317
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.010
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0009
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 102.688
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  12.619
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}bartik_iv_capacity
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           93              93              0     {c |} 
   district_fixed {c |}            0             285            285 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    6.33
{txt}{col 55}Prob > F      = {res}  0.0124
{txt}Total (centered) SS     = {res} 63447.09059{txt}{col 55}Centered R2   = {res}  0.8788
{txt}Total (uncentered) SS   = {res} 63447.09059{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 67817.58236{txt}{col 55}Root MSE      = {res}   9.471

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}demvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2} .0316933{col 34}{space 2} .0125948{col 45}{space 1}    2.52{col 54}{space 3}0.012{col 62}{space 4} .0069031{col 75}{space 3} .0564836
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.851
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0006
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 110.746
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  14.418
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}bartik_iv_capacity
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           99              99              0     {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    6.03
{txt}{col 55}Prob > F      = {res}  0.0147
{txt}Total (centered) SS     = {res} 63447.09059{txt}{col 55}Centered R2   = {res}  0.8798
{txt}Total (uncentered) SS   = {res} 63447.09059{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 67258.52083{txt}{col 55}Root MSE      = {res}   9.432

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}demvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} .0523733{col 31}{space 2} .0213351{col 42}{space 1}    2.45{col 51}{space 3}0.015{col 59}{space 4} .0103796{col 72}{space 3}  .094367
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.168
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0008
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 119.595
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  13.474
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}bartik_iv_capacity
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           99              99              0     {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    6.33
{txt}{col 55}Prob > F      = {res}  0.0124
{txt}Total (centered) SS     = {res}  63447.0914{txt}{col 55}Centered R2   = {res}  0.8788
{txt}Total (uncentered) SS   = {res}  63447.0914{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 67817.58275{txt}{col 55}Root MSE      = {res}   9.471

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}repvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}-.0316933{col 34}{space 2} .0125948{col 45}{space 1}   -2.52{col 54}{space 3}0.012{col 62}{space 4}-.0564836{col 75}{space 3}-.0069031
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.851
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0006
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 110.746
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  14.418
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}bartik_iv_capacity
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           99              99              0     {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    6.03
{txt}{col 55}Prob > F      = {res}  0.0147
{txt}Total (centered) SS     = {res}  63447.0914{txt}{col 55}Centered R2   = {res}  0.8798
{txt}Total (uncentered) SS   = {res}  63447.0914{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 67258.52124{txt}{col 55}Root MSE      = {res}   9.432

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}repvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2}-.0523733{col 31}{space 2} .0213351{col 42}{space 1}   -2.45{col 51}{space 3}0.015{col 59}{space 4} -.094367{col 72}{space 3}-.0103796
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.168
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0008
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 119.595
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  13.474
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}bartik_iv_capacity
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           99              99              0     {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 8 singleton observations)
{res}{txt}(converged in 8 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   285{txt}{col 55}Number of obs = {res}    1038
{txt}{col 55}F(  1,   284) = {res}    0.21
{txt}{col 55}Prob > F      = {res}  0.6504
{txt}Total (centered) SS     = {res} 53332.46938{txt}{col 55}Centered R2   = {res}  0.7350
{txt}Total (uncentered) SS   = {res} 53332.46938{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 53697.80619{txt}{col 55}Root MSE      = {res}   9.027

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}incumbvotesmajorpe~t{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2} .0059239{col 34}{space 2} .0130573{col 45}{space 1}    0.45{col 54}{space 3}0.650{col 62}{space 4}-.0197775{col 75}{space 3} .0316252
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.767
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0006
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71}  91.695
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  13.465
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}bartik_iv_count
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           93              93              0     {c |} 
      district_fixed {c |}            0             285            285 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 8 singleton observations)
{res}{txt}(converged in 8 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   285{txt}{col 55}Number of obs = {res}    1038
{txt}{col 55}F(  1,   284) = {res}    0.21
{txt}{col 55}Prob > F      = {res}  0.6509
{txt}Total (centered) SS     = {res} 53332.46938{txt}{col 55}Centered R2   = {res}  0.7350
{txt}Total (uncentered) SS   = {res} 53332.46938{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 53706.54541{txt}{col 55}Root MSE      = {res}   9.028

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}incumbvotesmajo~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2}  .009674{col 31}{space 2} .0213555{col 42}{space 1}    0.45{col 51}{space 3}0.651{col 59}{space 4}-.0323611{col 72}{space 3} .0517091
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.030
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0009
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 101.103
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  12.628
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}bartik_iv_count
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           93              93              0     {c |} 
   district_fixed {c |}            0             285            285 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    6.30
{txt}{col 55}Prob > F      = {res}  0.0126
{txt}Total (centered) SS     = {res} 63447.09059{txt}{col 55}Centered R2   = {res}  0.8787
{txt}Total (uncentered) SS   = {res} 63447.09059{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 67883.72767{txt}{col 55}Root MSE      = {res}   9.476

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}demvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2}  .031873{col 34}{space 2} .0127006{col 45}{space 1}    2.51{col 54}{space 3}0.013{col 62}{space 4} .0068745{col 75}{space 3} .0568714
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.843
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0006
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 108.886
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  14.408
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}bartik_iv_count
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           99              99              0     {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    6.00
{txt}{col 55}Prob > F      = {res}  0.0149
{txt}Total (centered) SS     = {res} 63447.09059{txt}{col 55}Centered R2   = {res}  0.8798
{txt}Total (uncentered) SS   = {res} 63447.09059{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 67310.20514{txt}{col 55}Root MSE      = {res}   9.436

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}demvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2} .0526282{col 31}{space 2} .0214939{col 42}{space 1}    2.45{col 51}{space 3}0.015{col 59}{space 4} .0103219{col 72}{space 3} .0949345
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.173
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0008
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 117.780
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  13.483
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}bartik_iv_count
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           99              99              0     {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    6.30
{txt}{col 55}Prob > F      = {res}  0.0126
{txt}Total (centered) SS     = {res}  63447.0914{txt}{col 55}Centered R2   = {res}  0.8787
{txt}Total (uncentered) SS   = {res}  63447.0914{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 67883.72807{txt}{col 55}Root MSE      = {res}   9.476

{txt}{hline 21}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 22}{c |}{col 34}    Robust
{col 1}repvotesmajorpercent{col 22}{c |}      Coef.{col 34}   Std. Err.{col 46}      t{col 54}   P>|t|{col 62}     [95% Con{col 75}f. Interval]
{hline 21}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_capacity_turbine {c |}{col 22}{res}{space 2} -.031873{col 34}{space 2} .0127006{col 45}{space 1}   -2.51{col 54}{space 3}0.013{col 62}{space 4}-.0568714{col 75}{space 3}-.0068745
{txt}{hline 21}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.843
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0006
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 108.886
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  14.408
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_capacity_turbine
Excluded instruments:{col 23}bartik_iv_count
{hline 78}

Absorbed degrees of freedom:
{hline 21}{c TT}{hline 49}{c TRC}
         Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 21}{c +}{hline 49}{c RT}
     stateyear_fixed {c |}           99              99              0     {c |} 
      district_fixed {c |}            0             287            287 *   {c |} 
{hline 21}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{err}(running historical version of reghdfe)
{res}{txt}(dropped 1 singleton observations)
{res}{txt}(converged in 5 iterations)
{res}
{txt}HDFE IV (2SLS) estimation
{hline 25}

Estimates efficient for homoskedasticity only
Statistics robust to heteroskedasticity and clustering on district_fixed

Number of clusters (district_fixed) = {col 33}{res}   287{txt}{col 55}Number of obs = {res}    1143
{txt}{col 55}F(  1,   286) = {res}    6.00
{txt}{col 55}Prob > F      = {res}  0.0149
{txt}Total (centered) SS     = {res}  63447.0914{txt}{col 55}Centered R2   = {res}  0.8798
{txt}Total (uncentered) SS   = {res}  63447.0914{txt}{col 55}Uncentered R2 = {res}       .
{txt}Residual SS             = {res} 67310.20555{txt}{col 55}Root MSE      = {res}   9.436

{txt}{hline 18}{c TT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{col 19}{c |}{col 31}    Robust
{col 1}repvotesmajorpe~t{col 19}{c |}      Coef.{col 31}   Std. Err.{col 43}      t{col 51}   P>|t|{col 59}     [95% Con{col 72}f. Interval]
{hline 18}{c +}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
cum_count_turbine {c |}{col 19}{res}{space 2}-.0526282{col 31}{space 2} .0214939{col 42}{space 1}   -2.45{col 51}{space 3}0.015{col 59}{space 4}-.0949345{col 72}{space 3}-.0103219
{txt}{hline 18}{c BT}{hline 11}{hline 11}{hline 9}{hline 8}{hline 13}{hline 12}
{help ivreg2##idtest:Underidentification test} (Kleibergen-Paap rk LM statistic):{res}{col 71}  11.173
{txt}{col 52}Chi-sq({res}1{txt}) P-val =  {res}{col 73}0.0008
{txt}{hline 78}
{help ivreg2##widtest:Weak identification test} (Cragg-Donald Wald F statistic):{res}{col 71} 117.780
{txt}                         (Kleibergen-Paap rk Wald F statistic):{res}{col 71}  13.483
{txt}Stock-Yogo weak ID test critical values:{res}{txt}{col 42}10% maximal IV size{res}{col 73} 16.38
{txt}{col 42}15% maximal IV size{res}{col 73}  8.96
{txt}{col 42}20% maximal IV size{res}{col 73}  6.66
{txt}{col 42}25% maximal IV size{res}{col 73}  5.53
{txt}Source: Stock-Yogo (2005).  Reproduced by permission.
NB: Critical values are for Cragg-Donald F statistic and i.i.d. errors.
{hline 78}
{help ivreg2##overidtests:Hansen J statistic} (overidentification test of all instruments):{res}{col 71}   0.000
{txt}{col 50}(equation exactly identified)
{hline 78}
Instrumented:{col 23}cum_count_turbine
Excluded instruments:{col 23}bartik_iv_count
{hline 78}

Absorbed degrees of freedom:
{hline 18}{c TT}{hline 49}{c TRC}
      Absorbed FE {c |}  Num. Coefs.  =   Categories  -   Redundant     {c |} 
{hline 18}{c +}{hline 49}{c RT}
  stateyear_fixed {c |}           99              99              0     {c |} 
   district_fixed {c |}            0             287            287 *   {c |} 
{hline 18}{c BT}{hline 49}{c BRC}
* = fixed effect nested within cluster; treated as redundant for DoF computation
{res}{txt}
{com}. 
. 
. *--------------------- Export LaTeX regression tables -----------------------*
. cd "$rootDir/$resultDir/Tables"
{res}/Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Results/Tables
{txt}
{com}. 
. ** Bartik - National Installed Wind Capacity
. esttab dem_capacity_bcapacity dem_count_bcapacity ///
>                 rep_capacity_bcapacity rep_count_bcapacity ///
>                 inc_capacity_bcapacity inc_count_bcapacity ///
>                 using TableA18.tex, booktabs replace ///
>                 refcat(cum_capacity_turbine "\emph{c -(}IV: Mean wind potential * National wind capacity{c )-}", nolabel) ///
>                 se noconstant nonotes legend nonumbers collabels(none) star(* 0.10 ** 0.05 *** 0.01) ///
>                 b(%9.3f) stats(N N_clust r2, labels("Observations" "States" "\(R^{c -(}2{c )-}\)") fmt(0 0 2)) ///
>                 varlabels(cum_capacity_turbine "Cumulative capacity (MW)" cum_count_turbine "Cumulative count") varwidth(27) modelwidth(13) ///
>                 mtitles("Model" "Model" "Model" "Model" "Model" "Model") ///
>                 mgroups("Democratic Vote" "Republican Vote" "Incumbent Vote", pattern(1 0 1 0 1 0) prefix(\multicolumn{c -(}@span{c )-}{c -(}c{c )-}{c -(}) suffix({c )-}) span erepeat(\cmidrule(lr){c -(}@span{c )-})) ///
>                 width(\hsize)
{res}{txt}(output written to {browse  `"TableA18.tex"'})

{com}. 
.                 
. 
. ** Close log file
. log close
      {txt}name:  {res}<unnamed>
       {txt}log:  {res}/Users/AliceZhang/Dropbox/Research_Columbia/Renewables Voting (Urpelainen Zhang)/JOP/UZ_JOP2021_Replication/Analysis/logSTATA/005_analysis_election.smcl
  {txt}log type:  {res}smcl
 {txt}closed on:  {res} 6 Nov 2021, 20:34:02
{txt}{.-}
{smcl}
{txt}{sf}{ul off}